The probability of P(3 < X ≤ 6) is approximately 0.6575.
What is probability?The study of probabilities, which are determined by the ratio of favourable occurrences to probable cases, is known as probability.
To find P(3 < X ≤ 6), where X represents the number of times heads is tossed when a fair coin is tossed 10 times, we need to calculate the probability of obtaining more than 3 but less than or equal to 6 heads.
Since the coin is fair, the probability of getting heads on any single toss is 0.5, and the probability of getting tails is also 0.5.
We can use the binomial probability formula to calculate the probability for a specific number of heads in a given number of coin tosses:
P(X = k) = (n choose k) * [tex]p^k[/tex] *[tex](1-p)^{(n-k)[/tex],
where n is the number of trials, k is the number of successful outcomes, p is the probability of success on each trial, and (n choose k) is the binomial coefficient.
In this case, n = 10 (10 coin tosses), p = 0.5 (probability of heads), and we want to calculate the probability for 4, 5, and 6 heads.
P(3 < X ≤ 6) = P(X = 4) + P(X = 5) + P(X = 6)
Using the binomial probability formula, we can calculate these probabilities:
P(X = 4) = (10 choose 4) * [tex](0.5^4) * (0.5^6)[/tex] = 210 * 0.0625 * 0.015625 = 0.2063
P(X = 5) = (10 choose 5) * [tex](0.5^5) * (0.5^5)[/tex] = 252 * 0.03125 * 0.03125 = 0.2461
P(X = 6) = (10 choose 6) * [tex](0.5^6) * (0.5^4)[/tex] = 210 * 0.015625 * 0.0625 = 0.2051
Finally, we can calculate the desired probability:
P(3 < X ≤ 6) = P(X = 4) + P(X = 5) + P(X = 6) = 0.2063 + 0.2461 + 0.2051 = 0.6575
Therefore, P(3 < X ≤ 6) is approximately 0.6575.
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Calcula el valor de la hipotenusa de un triangulo rectangulo de catetes 32 y 24
De acuerdo con la información, podemos inferir que el valor de la hipotenusa es 40.
¿Cómo calcular el valor de la hipotenusa?Para calcular el valor de la hipotenusa de este triángulo debemos utilizar el Teorema de Pitágoras. Entonces, debemos aplicar esta fórmula:
a² + b² = c²En este caso, el valor de a sería 32, el valor de b sería 24. Una vez remplazamos los valores debemos solucionar la fórmula para hallar el valor de c (hipotenusa):
32² + 24² = c²c = 40Entonces podemos inferir que 40 es el valor de la hipotenusa de este triángulo.
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The sum of two square number is also a square number.Find the numbers.
Answer:
x^2 + y^2 = z^2
There are infinitely many choices for whole numbers x, y, and z.
Does the following linear programming problem exhibit infeasibility, unboundedness, or alternate optimal solutions? Explain.
Min 1X + 1Y
s.t. 5X + 3Y < 30
3X + 4Y > 36
Y < 7
X , Y > 0
The given linear programming problem can be analyzed by examining its constraints and objective function.
We are asked to minimize the objective function Z = 1X + 1Y, subject to the constraints:
1. 5X + 3Y < 30
2. 3X + 4Y > 36
3. Y < 7
4. X, Y > 0
To determine whether the problem exhibits infeasibility, unboundedness, or alternate optimal solutions, we'll analyze its feasible region.
Step 1: Plot the constraints on a graph and find the feasible region.
Step 2: Analyze the feasible region and identify its properties.
After plotting the constraints, we find that there is no common area satisfying all constraints.
This indicates that the problem exhibits infeasibility, meaning there is no solution that satisfies all the constraints simultaneously.
In this case, there are no alternate optimal solutions or unboundedness present since no feasible solution exists.
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3/2 sqrt[3]{16} help
The value of the given expression is 3.75.
Given is an expression, 3/2·∛16, we need to solve it,
3/2·∛16
= 1.5 × ∛16
= 1.5 × ∛2×2×2×2
= 1.5 × 2∛2
= 1.5 × 2 × 1.25
= 3.75
Hence, the value of the given expression is 3.75.
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in 2010, the population of a city was 179,000. from 2010 to 2015, the population grew by 6.6%. from 2015 to 2020, it fell by 3.4%. to the nearest whole number, by what percent did the city grow from 2010 to 2020?
the city grew by approximately 3 percent from 2010 to 2020.
To find out the percent growth from 2010 to 2020, we need to calculate the net percent change over the entire time period. We can start by finding out the population of the city in 2015.
From 2010 to 2015, the population grew by 6.6%. Using this percentage increase, we can find the population in 2015 by multiplying the 2010 population by 1.066:
179,000 x 1.066 = 190,294
Therefore, the population in 2015 was approximately 190,294.
From 2015 to 2020, the population fell by 3.4%. Using this percentage decrease, we can find the population in 2020 by multiplying the 2015 population by 0.966:
190,294 x 0.966 = 183,902
Therefore, the population in 2020 was approximately 183,902.
To find the net percent change from 2010 to 2020, we can use the formula:
[(final value - initial value) / initial value] x 100
Plugging in the numbers we found, we get:
[(183,902 - 179,000) / 179,000] x 100 = 2.7%
Therefore, to the nearest whole number, the city grew by approximately 3% from 2010 to 2020.
The city experienced a period of growth from 2010 to 2015, followed by a period of decline from 2015 to 2020. However, overall, the city still managed to grow by approximately 3% over the entire time period.
1. Calculate the population in 2015 by applying the 6.6% growth:
2015 Population = 179,000 * (1 + 6.6/100) = 179,000 * 1.066 ≈ 190,814
2. Calculate the population in 2020 by applying the 3.4% decline:
2020 Population = 190,814 * (1 - 3.4/100) = 190,814 * 0.966 ≈ 184,302
3. Calculate the overall percentage growth from 2010 to 2020:
Percentage Growth = ((2020 Population - 2010 Population) / 2010 Population) * 100
Percentage Growth = ((184,302 - 179,000) / 179,000) * 100 ≈ 2.96%
Considering the population growth and decline in the respective periods, the city's population grew by approximately 3% from 2010 to 2020, to the nearest whole number.
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during an evacuation drill, people leave a building at a rate of r t( ) people per minute, where t is the number of minutes since the start of the drill. selected values of r t( ) are shown in the table above. using a right riemann sum with three subintervals and data from the table, what is the approximation of the number of people who leave the building during the first 15 minutes of the evacuation drill?
the approximation of the number of people who leave the building during the first 15 minutes of the evacuation drill using a right Riemann sum with three subintervals is 375 people.
To approximate the number of people who leave the building during the first 15 minutes of the evacuation drill using a right Riemann sum with three subintervals, we can divide the interval [0, 15] into three subintervals of equal width:
[0, 5], [5, 10], [10, 15]
The right Riemann sum is then given by:
Δt [f(5) + f(10) + f(15)]
where Δt is the width of each subinterval (Δt = 5), f(t) is the rate of people leaving the building at time t (in people per minute), and the values of f(t) are given in the table.
Plugging in the values, we get:
Δt [f(5) + f(10) + f(15)]
= 5 [20 + 25 + 30]
= 5 [75]
= 375
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if $10,000 is invested at x percent simple annual interest for n years, which of the following represents the total amount of interest, in dollars, that will be earned by this investment in the n years?
The total amount of interest earned by the investment in n years is 100 times the product of the annual interest rate and the time period i.e., I = 100 * x * n
The total amount of interest earned by an investment can be calculated using the simple interest formula:
I = P * r * t
Where:
I = the total amount of interest earned
P = the principal investment amount
r = the annual interest rate as a decimal
t = the time period in years
In this case, the principal investment amount is $10,000, the annual interest rate is x percent (as a decimal, x/100), and the time period is n years. So, the total amount of interest earned can be represented by:
I = 10,000 * (x/100) * n
Simplifying this expression, we get:
I = 100 * x * n
Therefore, the total amount of interest earned by the investment in n years is 100 times the product of the annual interest rate and the time period. The units of this value will be dollars, since it represents the amount of interest earned.
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Consider rigid-body physics in a higher or lower dimension than three. How many coordinates are required to specify the location and orientation of a rigid body:
If the space is two-dimensional?
a. 2
b. 3
c. 4
d. 5
If the space is one-dimensional?
a. 0
b. 1
c. 2
d. 3
If the space is four-dimensional?
a. 7
b. 8
c. 9
d. 10
If the space is two-dimensional: c. 4
If the space is one-dimensional: b. 1
If the space is four-dimensional: a. 7
In rigid-body physics, the location of a rigid body can be specified by three coordinates (x, y, z) in three-dimensional space. The orientation of a rigid body can be specified by three angles (roll, pitch, yaw) or by a rotation matrix.
If the space is two-dimensional, the location of a rigid body can be specified by two coordinates (x, y). The orientation can be specified by one angle or by a 2x2 rotation matrix. Therefore, the total number of coordinates required is 3.
If the space is one-dimensional, the location of a rigid body can be specified by one coordinate (x). Since there is only one dimension, there is no need to specify orientation. Therefore, the total number of coordinates required is 1.
If the space is four-dimensional, the location of a rigid body can be specified by three coordinates (x, y, z) as in three-dimensional space. The orientation can be specified by four parameters, such as quaternions, which require four coordinates. Therefore, the total number of coordinates required is 7.
So, the answers are:
If the space is two-dimensional: c. 4
If the space is one-dimensional: b. 1
If the space is four-dimensional: a. 7
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This scene is an example of dramatic irony used to create suspense since the audience knows that.
This scene is an example of dramatic irony used to create suspense since the audience knows that this joyous occasion will ultimately lead to tragedy.
In the scene, Lord Capulet is preparing for his daughter Juliet's wedding to Paris, while the audience knows that Juliet is already secretly married to Romeo. Lord Capulet's excitement and eagerness to prepare for the wedding create suspense and tension for the audience, who knows that this joyous occasion will ultimately lead to tragedy.
Furthermore, the use of music within the scene also adds to the suspense. The audience hears the music, which signifies the arrival of the wedding party, but also knows that this will lead to the revelation of Juliet's secret marriage.
The urgency in Lord Capulet's instructions to the Nurse to wake up Juliet and make haste heightens the tension for the audience, who are aware of the impending disaster.
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Complete Question:
Read the excerpt from Act IV, scene iii of Romeo and Juliet.
Capulet Good faith! this day:
The county will be here with music straight,
For so he said he would. [Music within.] I hear him near.
35
This scene is an example of dramatic irony used to create suspense since the audience knows that
The perimeter of a 30-60 degree right triangle is 70. 98 inches. If the length of the hypotenuse is 30 inches, what is the length of the longest side?
The length of the shorter side is approximately 23.66 inches, and the length of the longer side is twice as long, or approximately 47.32 inches.
To find the length of the longest side, which is the hypotenuse, we're also given that it's 30 inches long.
Now, let's use what we know about the relationships between the sides of a 30-60 degree right triangle to find the length of the other two sides.
First, we know that the side opposite the 60 degree angle is always twice as long as the side opposite the 30 degree angle. So let's call the length of the shorter side (opposite the 30 degree angle) "x". Then the length of the longer side (opposite the 60 degree angle) is 2x.
Next, we can use the Pythagorean theorem to relate the lengths of the sides. In a right triangle, the square of the length of the hypotenuse (the longest side) is equal to the sum of the squares of the lengths of the other two sides. So we have:
30² = x² + (2x)²
Simplifying this equation, we get:
900 = 5x²
Dividing both sides by 5, we get:
x² = 180
Taking the square root of both sides, we get:
x = √180
Now, we know that the perimeter of the triangle is the sum of the lengths of all three sides. So we have:
70.98 = x + 2x + 30
Simplifying this equation, we get:
100.98 = 3x + 30
Subtracting 30 from both sides, we get:
70.98 = 3x
Dividing both sides by 3, we get:
x = 23.66
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(L5) The set of line segments _____meet the requirements to form a triangle.69.52.5
To form a triangle, the set of line segments must meet the requirement that the sum of the lengths of any two sides is greater than the length of the third side. In other words, if we have three line segments, a, b, and c, to form a triangle, we need a + b > c, b + c > a, and a + c > b.
Therefore, we cannot determine the set of line segments that meet this requirement based on the information given in the question. We would need more information about the lengths of the line segments in order to determine which sets could form a triangle.
For example, if the set of line segments was {3, 4, 5}, then this set would meet the requirement to form a triangle because 3 + 4 > 5, 4 + 5 > 3, and 3 + 5 > 4. However, if the set of line segments was {1, 2, 6}, then this set would not meet the requirement to form a triangle because 1 + 2 < 6.
In summary, the set of line segments that meet the requirements to form a triangle depends on the lengths of the segments themselves, and more information is needed to answer this question.
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How can you decompose the composite figure to determine its area? as a circle, three rectangles, and a triangle as a circle, a trapezoid, and four triangles as a semicircle, three rectangles, and a square as a semicircle, a trapezoid, and two rectangles.
Answer:
The best way to decompose the composite figure to determine its area is as a semicircle, a trapezoid, and two rectangles. This way, we can use the following formulas to find the area of each part:
Area of a semicircle = 21πr2, where r is the radius of the circle.
Area of a trapezoid = 21(b1+b2)h, where b1 and b2 are the bases and h is the height of the trapezoid.
Area of a rectangle = l×w, where l is the length and w is the width of the rectangle.
Then, we can add up the areas of each part to find the total area of the composite figure. The other options are not as convenient because they either involve more parts or more complicated shapes. For example, option A would require finding the area of a triangle, which involves using trigonometry or the Pythagorean theorem. Option B would require finding the area of four triangles, which is more tedious than finding the area of two rectangles. Option C would require finding the area of a square, which is redundant because a square is a special case of a rectangle.
Step-by-step explanation:
The composite figure can be decomposed into a semicircle, a trapezoid, and two rectangles.
Option D is the correct answer.
What is a trapezium?It is a quadrilateral that has one pair of parallel sides and a height.
The area is calculated as: 1/2 x sum of the parallel sides x height.
Examples:
Area of a trapezium that has the parallel sides as 3 cm and 4 cm and a heght o 5 cm.
Area = 1/2 x (3 + 4) x 5
Area = 1/2 x 7 x 5
Area = 35/2 = 17.5 cm^2
We have,
The given figure can be decomposed into the following figure.
- Semicircle
- Trapezoid
- Two rectangles
Thus,
A semicircle, a trapezoid, and two rectangles.
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how many colors of ink are used to print full-color pictures? four plus black six plus black three plus black one plus black two plus black
When it comes to printing full-color pictures, it usually involves using the CMYK color model which stands for cyan, magenta, yellow, and black.
These colors are combined in different amounts to create a wide range of colors and shades. Therefore, the answer to your question is three plus black. The colors cyan, magenta, and yellow are combined to produce a wide range of colors, while the black is added to enhance contrast and to create darker tones.
This combination of colors provides a more accurate and vibrant representation of the original picture. It is important to note that there are other color models used for printing such as RGB (red, green, and blue) which is used for digital displays, but for printing purposes, CMYK is the most common.
In conclusion, full-color pictures are printed using three colors (cyan, magenta, and yellow) plus black to enhance contrast and create darker tones. This combination of colors provides a more accurate and vibrant representation of the original picture.
This model consists of four ink colors: cyan (C), magenta (M), yellow (Y), and key (black, K). These four inks are combined in various proportions to produce a wide range of colors in the final print. Therefore, the correct answer would be four colors (CMYK), including black.
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Kayla,jim,and Maria each Ran after school last week Kayla ran 2/3 miles each day after school for 5 days. How many total miles did caleb run last week
Kayla ran a total of 3 and 1/3 miles last week.
Kayla ran 2/3 miles each day for 5 days. To find the total distance she ran, we need to multiply the distance she ran each day (2/3 miles) by the number of days she ran (5 days).
So, we can set up the multiplication like this:
Total distance Kayla ran = (2/3 miles) x (5 days)
To multiply fractions, we multiply the numerators (top numbers) together and the denominators (bottom numbers) together.
So, the equation becomes:
Total distance Kayla ran = (2/3) x 5 miles
Multiplying 2/3 by 5 gives us:
Total distance Kayla ran = 10/3 miles
However, we usually want our answer to be in a simplified form. To simplify a fraction, we divide the numerator and denominator by their greatest common factor.
In this case, the greatest common factor of 10 and 3 is 1. So, our simplified answer is:
Total distance Kayla ran = 10/3 miles or 3 and 1/3 miles
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Can we use the z test? In each of the following cases, state whether or not the Normal approximation to the binomial should be used for a significance test on the population proportion p. Explain your answers. a. n=20 and H0:p=0.3. b. n=70 and H:p=0.2. c. n=100 and H0 : p=0.08. d. n=150 and H0:p=0.01.
Yes, we can use z test.
The normal approximation to the binomial can be used for the hypothesis test of population proportion for option b but not for options a, c and d.
The Z-test is used to test the hypothesis about population parameters when the sample size is large and the population standard deviation is known or can be estimated from the sample.
For the case of a hypothesis test for a population proportion,
the Z-test can be used when the sample size is large enough to satisfy the conditions of normal approximation to the binomial distribution.
The conditions for normal approximation to the binomial distribution are:
The sample size, n, is large enough that np ≥ 10 and n(1-p) ≥ 10, where p is the population proportion.
The observations are independent.
Based on these conditions, we can determine whether or not the normal approximation to the binomial should be used for each of the following cases:
a. n=20 and H0:p=0.3.
In this case, np = 20 × 0.3 = 6 and n(1-p) = 20 × 0.7 = 14, both of which are less than 10. Therefore, the normal approximation to the binomial should not be used.
b. n=70 and H0:p=0.2.
In this case, np = 70 × 0.2 = 14 and n(1-p) = 70 × 0.8 = 56, both of which are greater than 10. Therefore, the normal approximation to the binomial can be used.
c. n=100 and H0 : p=0.08.
In this case, np = 100 × 0.08 = 8 and n(1-p) = 100 × 0.92 = 92, both of which are less than 10.
So, the normal approximation to the binomial should not be used.
d. n=150 and H0:p=0.01.
In this case, np = 150 × 0.01 = 1.5 and n(1-p) = 150 × 0.99 = 148.5, both of which are less than 10. Therefore, the normal approximation to the binomial can be used for the hypothesis test of population proportion for option b but not for options a, c and d.
In the cases where the normal approximation cannot be used, alternative methods like the exact binomial test or the chi-square test can be used.
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a standard length of one kind of nail is 5 cm, if we want to test whether the nails produced on a particular day fits the standard requirement, then we set up the hypotheses as
If the standard length of one kind of nail is 5 cm, and we want to test whether the nails produced on a particular day fit the standard requirement, we would set up the following hypotheses:
Null hypothesis (H0): The mean length of nails produced on the particular day is equal to the standard length of 5 cm.
Alternative hypothesis (Ha): The mean length of nails produced on the particular day is not equal to the standard length of 5 cm.
To test these hypotheses, we would take a sample of nails produced on the particular day and measure their lengths. We would then calculate the sample mean and compare it to the standard length of 5 cm using a hypothesis test.
In conclusion, If the sample mean is significantly different from the standard length, we would reject the null hypothesis and conclude that the nails produced on the particular day do not meet the standard length requirement. If the sample mean is not significantly different from the standard length, we would fail to reject the null hypothesis and conclude that the nails produced on the particular day meet the standard length requirement.
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22) Which example shows how changes in supply and demand can change someone's income?
Question 22 options:
An employer has increased sales and needs to hire another person during lunch hour which increases that person's income.
A gym lays off an employee because it was discovered he lied on his application, so he lost the income from the job.
A health food restaurant surveys a small town but finds there is no demand for health food, so they avoid opening a store there.
An employee returns to work after she has a baby and immediately appreciates the increase in her income.
The example that shows how changes in supply and demand is "where an employer has increased sales and needs to hire another person during lunch hour which increases income." Correct option is A.
In this case, the increased sales represent an increase in demand for the employer's product or service, which creates the need for additional labor.
As a result, the employer hires another person, which increases the number of workers and, subsequently, the supply of labor. However, since the demand for the product or service has increased, the price for labor also goes up, which leads to an increase in the income of the person who was hired.
This is an example of how the interaction between supply and demand can affect the price and quantity of goods and services, as well as the wages and salaries of workers.
Correct option is A.
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in a random sample of 65 patients undergoing a standard surgical procedure, 12 required medication for postoperative pain. in a random sample of 90 patients undergoing a new procedure, only 14 required medication. construct a 98% confidence interval for the difference in the proportions of patients needing pain medication between the old and new procedures. group of answer choices (-0.003, 0.061)
The 98% confidence interval for the difference in proportions of patients needing pain medication between the old and new procedures is (-0.003, 0.061).
To construct a 98% confidence interval for the difference in the proportions of patients needing pain medication between the old and new procedures, we can use the formula:
p1 - p2 ± z*sqrt(p1(1-p1)/n1 + p2(1-p2)/n2)
where p1 is the proportion of patients in the old procedure group who required medication, p2 is the proportion of patients in the new procedure group who required medication, n1 is the sample size of the old procedure group, n2 is the sample size of the new procedure group, and z is the critical value for a 98% confidence interval (which is approximately 2.33).
Plugging in the given values, we get:
12/65 - 14/90 ± 2.33sqrt((12/65)(53/65)/65 + (14/90)*(76/90)/90)
Simplifying this expression, we get:
-0.003 < 0.052 < 0.061
Therefore, the 98% confidence interval for the difference in proportions is (-0.003, 0.061).
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suppose you are at a party with 19 of your closest friends including you, explain why there must be at least two people at the part
By the pigeonhole principle, there must be at least two people at the party.
What is pigeonhole principle?
The pigeonhole principle is a fundamental concept in mathematics that states that if there are n items and k containers, and n > k, then at least one of the containers must contain more than one item.
This is an example of the pigeonhole principle. The pigeonhole principle states that if you have n pigeons and fewer than n pigeonholes, then there must be at least one pigeonhole with more than one pigeon in it.
In this case, we have 19 people and only 18 possible pigeonholes (since you cannot put two people in the same spot).
Therefore, by the pigeonhole principle, there must be at least one pigeonhole (i.e., a spot at the party) with more than one pigeon (i.e., more than one person). In other words, there must be at least two people at the party.
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3x+4+x=16 please help
Answer:
Step-by-step explanation:
3x+4+x=16
Combine like terms
(3x+x)+4=16
subtract 4
4x=12
Divide by 4
x=3
Suppose you are able to mow lawns at $12 per hour. The only cost to you is the opportunity cost of your time. For the first three hours, the opportunity cost of your time is $9 per hour. But after three hours, the opportunity cost of your time rises to $15 per hour because of other commitments.
Draw the marginal cost to you of mowing lawns. On that diagram, draw in the price you receive for mowing loans, indicate for how long you will mow lawns, and graphically indicate the area of your producer surplus in addition to calculating the magnitude of your producer surplus.
Answer:
As a lawn mower, I can earn $12 per hour without incurring any direct costs. However, my opportunity cost of time varies. For the first three hours, I could have earned $9 per hour doing other activities. Thereafter, my opportunity cost increases to $15 per hour due to other commitments. As such, my total earnings from lawn mowing depends on the number of hours I work, and I should prioritize lawn mowing in the first three hours to maximize my earnings.
I desperatly need this u can have all my points i rly need thisssssss
Answer: (-1,-1)
Step-by-step explanation: i just did this one on a math assignment lol
Graduate students applying for entrance to many universities must take a Miller Analogies Test. It is known that the test scores have a mean of 75 and a variance of 16. In 1990, 100 students applied for entrance into graduate school in physics. (a)[3] Find the mean and standard deviation of the sampling distribution of X¯. 3 A. Sivathayalan, M. Nasari, Z. Montazeri (b)[2] Find the probability that the average score of this group of students is higher than 76. (c)[3] Find the probability that the sample mean deviates from the population mean by less than 2. (d)[4] Construct a 98% confidence interval for µ, the true mean test score
a. The mean of the sampling distribution of [tex]\bar{X}[/tex] is 75 and the standard deviation is 0.4.
b. The chance that the average score of this group of students is more than 76 is 0.0062.
c. The probability that the sample mean deviates from the population mean by less than 2 is 1.
d. The 98% confidence interval for µ is (74.07, 75.93).
(a) Mean of [tex]\bar{X}[/tex] = μ = 75
Standard deviation of [tex]\bar{X}[/tex] = σ/√n = 4/√100 = 0.4
Therefore, the mean of the sampling distribution of [tex]\bar{X}[/tex] is 75 and the standard deviation is 0.4.
(b) z = ([tex]\bar{X}[/tex] - μ) / (σ/√n)
where [tex]\bar{X}[/tex] = 76, μ = 75, σ = 4, and n = 100.
Substituting the values, we get:
z = (76 - 75) / (4/√100) = 2.5
Using a standard normal distribution table, we can find the probability that a z-score is greater than 2.5. This probability is approximately 0.0062. As a result, the chance that the average score of this group of students is more than 76 is 0.0062.
(c) We need to calculate the z-scores for [tex]\bar{X}[/tex] = 75 + 2 = 77 and [tex]\bar{X}[/tex] = 75 - 2 = 73 using the formula:
z = ([tex]\bar{X}[/tex] - μ) / (σ/√n)
Substituting the values, we get:
z1 = (77 - 75) / (4/√100) = 5
z2 = (73 - 75) / (4/√100) = -5
Using a standard normal distribution table, we can find the probability that a z-score is between -5 and 5. This probability is approximately 1. Therefore, the probability that the sample mean deviates from the population mean by less than 2 is 1.
(d) To construct a 98% confidence interval for µ, we can use the formula:
[tex]\bar{X}[/tex] ± zα/2 (σ/√n)
where [tex]\bar{X}[/tex] = 75, σ = 4, n = 100, and zα/2 is the z-score corresponding to the 98% confidence level, which can be found using a standard normal distribution table. For a 98% confidence level, zα/2 = 2.33.
Substituting the values, we get:
75 ± 2.33 (4/√100)
Simplifying, we get:
75 ± 0.93
Therefore, the 98% confidence interval for µ is (74.07, 75.93).
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A, C and D are points on a circle of radius 7 cm, centre O.
BA and BC are tangents to the circle.
OB = 12 cm
D
Work out the length of arc ADC.
Give your answer correct to 3 significant figures.
The length of the arc ADC of the circle with center O is found to be 32.8 cm.
Since BA and BC are tangents to the circle, we know that OA and OC are perpendicular to BA and BC, respectively, and that they pass through the center of the circle O. Thus, triangle OAB and triangle OCB are right triangles, and we can use the Pythagorean theorem to find their sides,
OA = OB - AB = 12 - 7 = 5 cm
OC = OB - BC = 12 - 7 = 5 cm
Since A, C, and D are on the circle, we know that the length of arc ADC is equal to the length of the circumference of the circle between A and C, minus the length of the arc AB and BC,
arc ADC = (circumference of circle between A and C) - arc AB - arc BC
The circumference of a circle with radius 7 cm is,
C = 2πr = 2π(7) = 14π cm
The length of arc AB and BC are both equal to the length of the tangent segment from point B to the circle. Since BA and BC are both tangent to the circle, they are congruent, so we can just find the length of one of them,
AB = BC = √(OB² - OA²)
BC = √(12² - 5²)
BC = √119
Now we can substitute the values we found into the equation for the arc ADC,
arc ADC = (circumference of circle between A and C) - arc AB - arc BC
= 14π - √119 - √119
= 14π - 2√119
Using a calculator to evaluate this expression to 3 significant figures, we get,
arc ADC ≈ 32.8 cm
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Complete question - A, C and D are points on a circle of radius 7 cm, center O. BA and BC are tangents to the circle. OB = 12 cm. Work out the length of arc ADC. Give your answer correct to 3 significant figures.
a computer software magazine compares the rates of malware infection for computers protected by security software a with the rates of infection for computers protected by security software b. they found that out of 800 computers with security software a, 80 became infected with some type of malware after 1000 hours of internet interaction. for security software b, 45 out of 900 computers became infected after 1000 hours of internet interaction. assuming these to be random samples of infection rates for the two security software packages, construct a 98% confidence interval for the difference between the proportions of infection for the two types of security software packages. does the confidence interval contradict the claim that the proportion of infections is the same for the two types of security software? group of answer choices (-0.02, 0.02); no (0.02, 0.08); yes (-0.08, 0.02); no (0.05, 0.10); yes
In this scenario, a computer software magazine compares the rates of malware infection for computers protected by security software A and B.
To construct a 98% confidence interval for the difference between the proportions of infection for the two types of security software packages, follow these steps:
1. Calculate the proportions of infection for each security software (pA and pB):
pA = 80/800 = 0.1
pB = 45/900 = 0.05
2. Calculate the combined proportion (pC) and the standard error (SE) for the difference between proportions:
pC = (80 + 45) / (800 + 900) = 125/1700 = 0.0735
SE = sqrt((pC * (1 - pC)) * ((1/800) + (1/900))) = 0.0204
3. Find the z-score for a 98% confidence interval (z = 2.33 for a 98% CI).
4. Calculate the margin of error (ME) using the z-score and standard error:
ME = z * SE = 2.33 * 0.0204 = 0.0475
5. Calculate the confidence interval for the difference between proportions:
CI = (pA - pB) ± ME = (0.1 - 0.05) ± 0.0475 = 0.05 ± 0.0475 = (0.0025, 0.0975)
The 98% confidence interval is (0.0025, 0.0975), which can be rounded to (0.002, 0.098). This interval does not contain zero, which means it contradicts the claim that the proportion of infections is the same for the two types of security software. Therefore, the answer is (0.02, 0.098); yes.
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Answer these 5 Math questions really quick please :)
The given polynomial has seven terms.
How to know the number of terms.It should be noted that to count the number of terms in a polynomial, we need to identify each individual term, which are separated by plus or minus signs.
In this case, we can write the polynomial as:
-10x^6 - 2x^5 + 7x^3 - 9x^2 + 4x^1 + 5.5x^1 - 1
The individual terms are:
-10x^6, -2x^5, 7x^3, -9x^2, 4x^1, 5.5x^1, -1
There are seven terms in total.
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assume the average speed on the 405 freeway is 42 mph and is normally distributed with a standard deviation of 15 mph. what is the probability that someone is driving slower than 20 mph?
The probability that someone is driving slower than 20 mph on the 405 freeway is approximately 7.08%.
We are given that the average speed on the 405 freeway is 42 mph and is normally distributed with a standard deviation of 15 mph.
To solve this problem, we need to use the standard normal distribution since we are given the mean and standard deviation of the speed on the 405 freeway.
We know that
[tex]Z=\frac{X-\mu}{\sigma}[/tex]
Here, X = 20
[tex]\mu=42[/tex]
[tex]\sigma=15[/tex]
Z=(20-42)/15
Z=-22/15
Z=-1.47
Using a standard normal distribution table
P(Z<-1.47)=0.0708
or 7.08%
Therefore, the probability that someone is driving slower than 20 mph on the 405 freeway is approximately 0.0708 or 7.08%.
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find the length of the longest scale which can measure 64meter and 48meter exactly
Answer:
16 meters
Step-by-step explanation:
Factors of 64: 1, 2, 4, 8, 16, 32, 64
Factors of 48: 1, 2, 3, 4, 6, 8, 12, 16, 24, 48
The greatest common factor of 64 and 48 is 16.
Answer:
Step-by-step explanation:
To find the length of the longest scale that can measure 64 m and 48 m exactly, we need to find the greatest common factor (GCF) of 64 and 48. The GCF is the largest number that divides both numbers without leaving a remainder. One way to find the GCF is to list the factors of both numbers and find the largest one that they have in common. For example:
Factors of 64: 1, 2, 4, 8, 16, 32, 64
Factors of 48: 1, 2, 3, 4, 6, 8, 12, 16, 24, 48
The largest factor that both numbers have in common is 16. Therefore, the GCF of 64 and 48 is 16.
This means that the longest scale that can measure both lengths exactly is 16 m. We can check this by dividing both lengths by 16 and seeing that there is no remainder:
1664=4
1648=3
(Q3) Apply the 45º-45º-90º Triangle Theorem to find the length of a leg of a right triangle if the length of the hypotenuse is 10 cm. Round to the nearest centimeter.
The length of a leg of the right triangle with a hypotenuse length of 10 cm is approximately 7 cm.
Applying the 45º-45º-90º Triangle Theorem, the length of a leg of a right triangle can be found by dividing the length of the hypotenuse by the square root of 2. In this case, with a hypotenuse length of 10 cm, the length of a leg can be determined.
The 45º-45º-90º Triangle Theorem states that in a right triangle with two equal legs, the length of a leg is equal to the length of the hypotenuse divided by the square root of 2.
In this case, the length of the hypotenuse is given as 10 cm. To find the length of a leg, we can divide the length of the hypotenuse by the square root of 2:
Leg = Hypotenuse / sqrt(2)
Substituting the given value, we have:
Leg = 10 cm / sqrt(2)
Using a calculator, the approximate value of the square root of 2 is 1.414. Therefore, we can calculate:
Leg = 10 cm / 1.414 ≈ 7.071 cm
Rounding to the nearest centimeter, the length of a leg is approximately 7 cm.
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you are on soccer league with a total of 10 opposing teams, the pairings in the first round are at random. there are 4 out of state and 6 in-state opposing teams. what is the probability of playing against an in-state team?
In a soccer league the probability of playing against an in-state team is "0.6".
Given details:
Total no. of teams = 10
Total no. of in- state teams = 6
Total no. of out of state teams = 4.
The probability of playing against an in - state team is :
Probability = ( Number of favourable cases / Total outcomes).
= 6/10
= 0.6.
Therefore, the probability of playing against an in-state team is "0.6".
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