a) Janet would save $17.20 - $5.60733 = $11.59 by borrowing the money for the printer at 6% to take advantage of the cash discount. b) , the difference in the final payment between choices 1 and 2 is $1,107.60.
How to answer the aforementioned questionsa. The cash discount on the printer is calculated as 2% of the list price:
Cash discount = 2% * $860 = $17.20
Using the formula:
Interest = Principal * Rate * Time
Principal = Amount borrowed = List price - Cash discount = $860 - $17.20 = $842.80
Rate = 6% per year = 6%/100 = 0.06
Time = 30 days (since the terms are 2/10, n/30)
To convert the interest to a 360-day basis, we use the formula:
Interest = Principal * Rate * (Time/360)
Interest = $842.80 * 0.06 * (30/360) = $5.60733
Therefore, Janet would save $17.20 - $5.60733 = $11.59 by borrowing the money for the printer at 6% to take advantage of the cash discount.
b. Choice 1 for the computer involves paying $150 per month for 17 months, with the 18th payment paying the remainder of the balance. Choice 2 involves paying 6% interest for 18 months in equal payments.
For choice 1:
Remaining balance = List price - (17 * Monthly payment)
Remaining balance = $4,020 - (17 * $150) = $4,020 - $2,550 = $1,470
For choice 2:
Interest = Principal * Rate * Time
Principal = Amount borrowed = List price = $4,020
Rate = 6% per year = 6%/100 = 0.06
Time = 18 months
To convert the interest to a 12-month basis, we use the formula:
Interest = Principal * Rate * (Time/12)
Interest = $4,020 * 0.06 * (18/12) = $362.40
The final payment difference between choices 1 and 2 is:
Final payment difference = Remaining balance - Interest
Final payment difference = $1,470 - $362.40 = $1,107.60
Therefore, the difference in the final payment between choices 1 and 2 is $1,107.60.
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The figure shows the dimensions for a package to be shipped.
A trapezoidal prism. The front and back are trapezoids.The distance from the trapezoidal front to the trapezoidal back is 15 inches.
The slant is on the right side. The Height on the left is 6 inches, On the top, the width from the left to the top of the slanted side is 4 inches. The distance of the slant from top to bottom is 10 inches. The entire width of the base from the left to right (that is, from the left side of 6 inches to the bottom of the slant) is 12 inches.
What is the minimum amount of wrapping paper, in square inches, needed to cover the package?
Answer:
Step-by-step explanation:
To calculate the amount of wrapping paper needed to cover the package, we need to find the area of each face of the trapezoidal prism and add them together.
First, we can find the area of the trapezoidal front and back faces. The formula for the area of a trapezoid is:
Area = (a + b) / 2 * h
where a and b are the lengths of the parallel sides, and h is the height. For the front and back faces, we have:
Front/back area = ((6 + 12) / 2) * 15 = 135 square inches
Next, we can find the area of the top and bottom faces, which are rectangles. The formula for the area of a rectangle is:
Area = length * width
For the top and bottom faces, we have:
Top/bottom area = 4 * 12 = 48 square inches
Finally, we need to find the area of the two slanted faces. These faces are parallelograms, and the formula for the area of a parallelogram is:
Area = base * height
where the base is the distance between the two parallel sides, and the height is the perpendicular distance between the two parallel sides. For the slanted faces, we have:
Slanted face area = 1/2 * (12 + 4) * 10 = 80 square inches
Now we can add up all the areas to get the total amount of wrapping paper needed:
Total area = Front/back area + Top/bottom area + 2 * Slanted face area
Total area = 135 + 48 + 2 * 80
Total area = 343 square inches
Therefore, the minimum amount of wrapping paper needed to cover the package is 343 square inches.
You are landscaping your backyard and want to fertilize the lawn. Home Depot sells SuperGreen lawn fertilizer in large bags. Each bag is estimated to cover about 3,500 square feet. Your lawn is 3/4 of an acre.
How many bags are required to fertilize your lawn? Assume you cannot purchase partial bags. You have to purchase whole bags. Helpful hint: 1 acre is 43,560 square feet.
Answer:
10
Step-by-step explanation:
1 acre = 43560 ft²
3/4 acre = 3/4 × 43560 ft² = 32670 ft²
The lawn is 32670 ft².
Each bag covers 3500 ft².
number of bags needed = 32670/3500 = 9.33
You need approximately 9 1/3 bags, but since you must buy full bags, you must buy 10 bags.
Answer: 10
Which lists the possible types of roots for
f
(
x
)
=
3
x
4
+
7
x
3
+
2
x
2
+
x
+
9
?
Answer:
Please provide more details!
To determine the specific type of roots for the given quartic equation, we need to solve it or analyze its discriminant. However, without further calculations, we cannot determine the exact types of roots for f(x) = 3x^4 + 7x^3 + 2x^2 + x + 9.
Answer: ±1, ±3, ±9, ±[tex]\frac{1}{3}[/tex]
Step-by-step explanation:
f(x)=3x⁴+7x³+2x²+9
To find all possible roots, you take the last number and all its factors and put it over the first number and all its factors.
Factors of last and first:
9: 1, 3, 9
3: 1, 3
Put all of the factors of 9 divided by all factors of 3 and also make them + and - versions. Also eliminate any repeats like ± [tex]\frac{1}{1}[/tex] and ± [tex]\frac{3}{3}[/tex]
±1, ±3, ±9, ±[tex]\frac{1}{3}[/tex]
A spinner with equally sized slices, has 4 red slices, 3 yellow slices, and 3 blue slices. Debra spun the dial 200 times and got the following results. 85 red, 58 yellow, 57 blue
The probability for the dial stops on a red or blue slice is,
P = 7/8.
Since, We know that;
Probability is to measure of the likelihood of an event occurring.
Hence, It is a number between 0 and 1,
Since, The closer the probability is to 1, the more likely the event is to occur.
Hence, Probability can make predictions and decisions in various fields, including finance, statistics, etc.
Since, There are 4 red and 3 blue slices,
Hence, a total of slices,
= 4 + 3
= 7 slices that are either red or blue.
So, The probability of the dial stopping on a red or blue slice,
Probability = ( red or blue slices) / (total of slices)
Probability = 7/8
Therefore, the probability for the dial stops on a red or blue slice is 7/8.
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Complete question is,
A spinner with 8 equally sized slices has 4 red slices, 3 blue slices, and 1 yellow slices. The dial is spun and stops on a slice at random. What is the probability that the dial stops on a red or blue slice?
Write your answer as a fraction in the simplest form.
Factor the trinomial 9x² 18x +9 9x² - 18x + 9 = (Ax − B)² 9? where A is and B is
The trinomial expression when factored is (3x - 3)² & A = 3 and B = 3
Factoring the trinomial expressionFrom the question, we have the following parameters that can be used in our computation:
9x² - 18x + 9 = (Ax − B)²
Factor out 9 in the expression
So we have
9(x² - 2x + 1) = (Ax − B)²
When the above expression is factored
We have
9(x - 1)² = (Ax − B)²
Express 9 as 3²
3²(x - 1)² = (Ax − B)²
So, we have
(3x - 3)² = (Ax − B)²
This means that
A = 3 and B = 3
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Guys i need urgent help here please.
If the temperature of a chemical mixture is tan√x degree celsius after x hours then the rate of change of temperature after π /4 hours is 0.141099
We are given that the temperature of the chemical mixture after x hours is given by:
T(x) = tan(√x)
To find the rate of change of temperature after π/4 hours, we need to find the derivative of T(x) with respect to x and evaluate it at x = π/4.
T'(x) = sec²(√x)/2√x
So, the rate of change of temperature after π/4 hours is given by:
T'(π/4) = sec²(√(π/4))/2√(π/4)
= sec²(π/2)/2√(π/4)
= 1/2√(π/4)
We can simplify this expression as:
T'(π/4) = 1/2(π/2)⁰⁵
= 0.141099
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the blank is measure of a countrys total ecenomic output
Answer:
The blank is "Gross Domestic Product (GDP)."
Find the Surface Area of Number 1
Answer:
the answer is: 258
How?:
Area:
2(wl+hl+hw)
2(9×6 + 5×6 + 5×9) = 258
Given: f(x) = 4.1 42 4x-10 x-2 Determine the x- and y-intercepts of f. 4.3 a x=2² Write f(x) in the form: f(x)=- + q. Draw the graph of f, clearly show the intercepts with the axes and the asymptotes.: 15. 44 Give the equations of the asymptotes of f(x) + 3.
f(x) = 4.1/(42.4x-10(x-2)), x-intercept = -4.878, y-intercept = (0,-2.05), asymptotes: vertical at x=2, horizontal at y=0, and slant at y=4.1/8x.
Given: f(x) = 4.1/(42.4x-10(x-2))
To find the x-intercept, we set f(x) to zero and solve for x:
0 = 4.1/(42.4x-10(x-2))
0 = 4.1/(32.4x+20)
0 = 4.1/4.08(x+4.878)
So, the x-intercept is x = -4.878.
To find the y-intercept, we set x to zero and solve for f(x):
f(0) = 4.1/(42.4(0)-10(0-2))
f(0) = -2.05
So, the y-intercept is (0,-2.05).
To write f(x) in the form f(x) = -1/(ax + b) + q, we can simplify the expression as follows:
f(x) = 4.1/(42.4x-10(x-2))
f(x) = 4.1/(32.4x+20)
f(x) = 4.1/4.08(8x+5)
So, a = 8, b = 5, and q = 4.1/4.08.
To draw the graph of f, we plot the x- and y-intercepts and the vertical asymptote x = 2.
We can find the horizontal asymptote by noting that as x becomes very large or very small, the term 10(x-2) dominates the expression, so f(x) approaches 4.1/-10x. Thus, the horizontal asymptote is y = 0.
To find the equations of the slant asymptotes, we divide the numerator by the denominator using long division:
4.1
8x + 5 | 4.1
- 4.1
0
So, the slant asymptote is y = 4.1/8x.
Therefore, the intercepts of f are x = -4.878 and (0,-2.05), and the equation of f(x) in the form f(x) = -1/(ax + b) + q is f(x) = -1/(8x + 5) + 1.0039.
The graph of f has intercepts with the x-axis at x = -4.878 and the y-axis at (0,-2.05), a vertical asymptote at x = 2, a horizontal asymptote at y = 0, and a slant asymptote at y = 4.1/8x.
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Intelligence Quotient (IQ) scores are often reported to be normally distributed with μ=100.0
and σ=15.0
. A random sample of 45
people is taken.
Step 1 of 2 : What is the probability of a random person on the street having an IQ score of less than 99
? Round your answer to 4
decimal places, if necessary.
The probability of a random person on the street having an IQ score of less than 99 is 0.4729.
We have,
We need to standardize the IQ score using the formula:
z = (x - μ) / σ
So,
For x = 99,
z = (99 - 100) / 15
z = -0.067
We can then use a standard normal distribution table or calculator to find the probability of a z-score less than -0.067.
Using a standard normal distribution table, we find that the probability of a z-score less than -0.067 is 0.4729
Therefore,
The probability of a random person on the street having an IQ score of less than 99 is 0.4729.
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Geometry- how do I complete these transformations
The coordinates of the image after the rotation are given as follows:
J'(-4,1).K'(-6, 4).L'(-4, 9).M'(-1,4).What are the rotation rules?The five more known rotation rules are given as follows:
90° clockwise rotation: (x,y) -> (y,-x)90° counterclockwise rotation: (x,y) -> (-y,x)180° clockwise and counterclockwise rotation: (x, y) -> (-x,-y)270° clockwise rotation: (x,y) -> (-y,x)270° counterclockwise rotation: (x,y) -> (y,-x).The coordinates of the original image are given as follows:
J(1,4).K(4,6).L(9,4).M(4,1).The rotation is a 90º counterclockwise about the origin, hence the rule is given as follows:
(x,y) -> (-y, x).
Meaning that the coordinates of the rotated image are given as follows:
J'(-4,1).K'(-6, 4).L'(-4, 9).M'(-1,4).More can be learned about rotation rules at brainly.com/question/17042921
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The Graph Of F′, The Derivative Of A Function F, Consists Of Two Line Segments And A Semicircle, As Shown In The Figure Above. If F(2)=1, Then F(−5)=
https://apcentral.collegeboard.org/media/pdf/ap-calculus-bc-practice-exam-2012.pdf?course=ap-calculus-bc question 18
The graph of the derivative, F', shows that the slope is positive until x = 2 (the right end of the semicircle) and then becomes zero.
Since the graph of F' consists of two line segments and a semicircle, we can determine the values of F using the information provided.
Let's break down the problem into different intervals based on the graph:
Interval (-∞, -5):
Since we don't have specific information about this interval, we cannot determine the exact value of F(-5).
Interval (-5, 0):
In this interval, we have a line segment. Let's assume the equation of the line segment is y = mx + b. We can find the equation of this line segment by using the slope-intercept form of a line and the given point (2, 1).
The slope of the line can be calculated using the difference in y-coordinates divided by the difference in x-coordinates:
m = (1 - F(2)) / (2 - (-5)) = (1 - 1) / 7 = 0/7 = 0
Since the slope is 0, the equation of the line becomes y = b. Plugging in the point (2, 1) into the equation, we get:
1 = b
Therefore, the equation of the line segment for the interval (-5, 0) is y = 1.
Interval (0, ∞):
In this interval, we have a semicircle. The graph of the derivative, F', shows that the slope is positive until x = 2 (the right end of the semicircle) and then becomes zero. This indicates that the original function F is increasing until x = 2 and remains constant afterward.
Since F(2) = 1, we can conclude that F(x) = 1 for x ≥ 2. Therefore, F(-5) cannot be determined based on the given information.
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Hellpppp
Please
I will give 10
is 0.00008093 rational
Kevin has money in two savings accounts. One rate is 11% and the other is 14%. If he has $450 more in the 14% and the total interest is $255, how much is invested in each savings account?
$6,500 is invested in 11% account.
$6,950 is invested in 14% account.
How much is invested in each account?Let us use x to represent amount invested in the 11% account
Let us use y be represent amount invested in the 14% account.
We can set up system of two equations:
[tex]x + y =[/tex] Total amount invested
0.11x + 0.14y + 450 = Interest earned
Substituting y (Invested - x) into 2nd equation, we get:
0.11x + 0.14(Amount invested - x) + 450 = 255
We solve for x
0.03x + 450 = 255
0.03x = 195
x = 195 / 0.03
x = $6500
As $6,500 is invested in the 11% account. The amount invested in 14% interest account is:
= $6,500 + $450
= $6,950.
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Plot the following points on the coordinate plane: (Tell me the answer)
A(5,0), B(3,2), C(0,5), and D(-6,1) are all located in the first quadrant. D(-6,1) is located within the second quadrant.
A coordinate system within geometry is a way to use one or more integers, or coordinates, to determine the exact placement of points and other geometrical objects over a manifold, such Euclidean space. The order of the coordinates is crucial, and they are frequently identified by their position within an arranged tuple or through a letter, such as "the x-coordinate." Within the first quadrant is A(5,0). The first quadrant is occupied by B(3,2), followed by C(0,5) with the first quadrant, D(-6,1) with the second quadrant, E(-4,4) from the second quadrant, and F(2,-3) with the fourth quadrant.
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please help me with this
Answer:
f(- 5) = 10
Step-by-step explanation:
the absolute value function always gives a positive value, that is
| - a | = | a | = a
given
f(x) = 5 + | x |
to find f(- 5) substitute x = - 5 into f)x)
f(- 5) = 5 + | - 5| = 5 + | 5 | = 5 + 5 = 10
al Thinking and Logic: Practice
Question 4 of 5
Select the correct answer from each drop-down menu.
Complete the contrapositive of the following statement.
If x is a multiple of 10, it is an even number.
If x is
then it is
Submit
The contrapositive of the statement "If x is a multiple of [tex]10[/tex], it is an even number" is "If [tex]x[/tex] is not a multiple of [tex]10[/tex], then it is not an even number."
To complete the contrapositive of the statement "If [tex]x[/tex] is a multiple of [tex]10[/tex], it is an even number," we need to negate and reverse the original statement.
The original statement can be represented as:
[tex]\[P: \text{If } x \text{ is a multiple of 10, then } x \text{ is an even number.}\][/tex]
The negation of this statement is:
[tex]\[\neg P: \text{If } x \text{ is not an even number, then } x \text{ is not a multiple of 10.}\][/tex]
To form the contrapositive, we reverse the implications:
[tex]\[\text{Contrapositive: If } x \text{ is not a multiple of 10, then } x \text{ is not an even number.}\][/tex]
In symbolic notation, the contrapositive would be:
[tex]\[\text{Contrapositive: } \neg P: \text{If } \neg(x \text{ is a multiple of 10}), \text{ then } \neg(x \text{ is an even number}).\][/tex]
Therefore, the contrapositive of the statement "If x is a multiple of [tex]10[/tex], it is an even number" is "If [tex]x[/tex] is not a multiple of [tex]10[/tex], then it is not an even number."
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7. Solve the inequality. (1 point)
d-6>-4
Od>-2
Od>-10
Od>2
Od> 10
Answer:
so you start with D-6>4
then you add 6 to both sides now you have D>10
the answer is D
Can someone help me to answer these questions using the graph please
a. The concentration of the drug after 8 hours is equal to 24 mg/L.
b. The interval over which the concentration increases is 0 < t < 2. The interval over which the concentration decreases is 2 < t < ∞.
c. The drug is at its maximum concentration when t = 2 hours and the maximum concentration is 64 mg/L.
d. After the drug reaches its maximum concentration, the number of hours that are required for the concentration to decrease to 16 mg/L is 8 hours.
e. After 1 week and 1 month, we can predict that the concentration of the drug kept decreasing after reaching 20 hours.
f. After the drug is taken orally, it took exactly 2 hours to reach a maximum concentration of 64 mg/L.
How to determine the concentration of the drug after 8 hours?By critically observing the graph, the time and concentration of the drug after 8 hours is represented by the order pair (8, 24). Therefore, the concentration is equal to 24 mg/L.
Part b.
For any given function, y = f(x), if the output value (range or y-value) is decreasing when the input value is increased, then, the function is generally referred to as a decreasing function.
For any given function, y = f(x), if the output value (range) is increasing when the input value is increased, then, the function is generally referred to as an increasing function.
By critically observing the graph of the given function, we can reasonably infer and logically deduce the following:
The function is increasing over the interval [0, 2] or 0 < t < 2.The function is decreasing over the interval [2, ∞] or 2 < t < ∞.Part c.
The vertex (2, 64) of the graph represent the point where the drug is at its maximum concentration, which is time (t) = 2 hours and the maximum concentration is y = 64 mg/L.
Part d.
After the drug reaches its maximum concentration, the number of hours that are required for the concentration to decrease to 16 mg/L can be calculated from the graph as follows;
Number of hours = 10 - 2
Number of hours = 8 hours.
Part e.
After 1 week and 1 month, it can be predicted that the concentration of the drug kept decreasing after reaching 20 hours.
Part f.
After the drug is taken orally, it took exactly 2 hours to reach a maximum concentration of 64 mg/L. Subsequently, the level of the drug in the bloodstream drops after reaching its maximum concentration, reaching approximately 10 mg/L after 12 hours.
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The average team score for the first 5 basketball game of the season is 45 points the scores of the first 5 game are 54 60 28 42
The average team score for the first five basketball games is 46 points.
Understanding MeanTo find the average team score for the first five basketball games, we simply use Mean.
Mean is the sum of the scores and divide it by the number of games.
Given scores:
Game 1 score = 54
Game 2 score = 60
Game 3 score = 28
Game 4 score = 42
Sum of scores = 54 + 60 + 28 + 42
= 184
Number of games = 4 (since we have scores for only four games)
Average team score (Mean) = Sum of scores / Number of games
= 184 / 4
= 46
Therefore, the average team score for the first five basketball games is 46 points.
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1. What will be the place
value of the number in
thousand's place for the
number that is obtained
by adding 60 tens, 58
hundreds and 685 ones?
Identify the number is
even or odd.
2.What is the difference
between the
Predecessor and
successor of a number?
Illustrate with an
example.
The evaluation of the value of the arithmetic operation based on the place value of the numbers indicates;
1. The number in the thousands place is; 7
The number is od
2. The difference between the predecessor and successor of the set of integers is; 8 - 6 = 2
What are arithmetic operations?Arithmetic operations are operations including, addition, subtraction, division and multiplication.
1. The numbers to be added are; 600, 5800, and 685
The sum of the numbers is; 600 + 5800 + 685 = 7085
Therefore, the place value in the thousands place is 7
The last digit of the number 7085 is 5 indicating that the number is an odd number
2. The predecessor of a number is the number that comes before the number.
The successor of the number is the number that comes after the number
The difference between the predecessor and the successor of a number therefore is; n + 1 - (n - 1) = n + 1 - n + 1 = 2
Example; 8 - 6 = 2
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If 5+10+20+... = 5115, what is the value of n?
The value of n on the series 5 + 10 + 20 + ... = 5115 is 10
How to find the value of nThe given sequence is 5, 10, 20, ... is a geometric progression (GP) with
first term a = 5 and
common ratio r = 2
formula for the sum of the first n terms of a GP
Sn = a(rⁿ - 1) / (r - 1)
Substituting the values we have
5115 = 5(2ⁿ - 1) / (2 - 1)
Simplifying and multiplying both sides by 1
1023 = 2ⁿ - 1
2ⁿ = 1024
2ⁿ = 2¹⁰
Equation powers
n = 10
Therefore, the value of n is 10.
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A fair number cube with faces numbered 1 through 6 was rolled 12 times. The cube landed with the number 2 face up 6 times. What is the difference between the experimental probability and the theoretical probability of the number 2 landing face up?
Select one:
a. 1/6
b. 1/3
c. 1/2
d. 2/3
Find the area of the circle. Use pie = 3.14.
Answer: 314 mi
Step-by-step explanation:
Area of a circle = (pi) * (radius)^2
Radius is 1/2 the diameter
Radius = 10
10^2 = 100
100*3.14 = 314
Work the following problem using the table. Choose the correct answer.
Currency on hand = 5,000 Italian lira
Currency desired = United States dollars
How many United States dollars based on Wednesday quotation? $
Based on the Tuesday rate, $100 United States dollars is equal to 843.64 French francs.
One hundred US dollars are equivalent to 834.3664 French francs at the exchange rate on Tuesday. Accordingly, you can swap eight hundred forty-three point 64 years old French francs for every one hundred dollars in the United States.
1. From the tables, the Tuesday rate is 0.119 US dollars to 1 French franc.
2. To find the exchange rate, multiply the number of US dollars by the exchange rate: 100 x 0.119 = 11.90.
3. To find the amount in French francs, divide the US dollars by the exchange rate: 11.90 / 0.119 = 843.64 French francs. Based on the Tuesday rate, $100 United States dollars is equal to 843.64 French francs.
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5. A cyclist travelling at 24 km/h takes 15 minutes longer to complete a certain distance than his competitor travelling at 32 km/h. Calculate the distance covered
The calculated value of the distance covered is 2 km
Calculating the distance covered From the question, we have the following parameters that can be used in our computation:
Speeds = 24 km/h and 32 km/h
The time difference is given as
Time = 15 minutes
The distance covered is calculated as
Distance = (Change in speed) * Time
Substitute the known values in the above equation, so, we have the following representation
Distance = (32km/h - 24km/h) * 15 minutes
Evaluate
Distance = 2 km
This means that the distance covered is 2 km
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What is the equivalent radian measure for an angle that
measures 52°?
Answer:
52° is approximately 0.907 radians
Step-by-step explanation:
To find the equivalent radian measure for an angle that measures 52°, we need to convert 52° to radians using the formula:
radians = degrees × π/180
Substituting the value of 52° into the formula, we get:
radians = 52 × π/180
radians ≈ 0.907
Therefore, the equivalent radian measure for an angle that measures 52° is approximately 0.907 radians.
Select the correct answer. Solve the following equation for x. x2 - 36 = 0
Answer:
x=18 or x=6
Step-by-step explanation:
2x=36
x=18
if it was x^2 then
x^2=36
x=6
In 2020, there were about 286 million (use the number as is, do not change into
millions) gas powered cars on the road. This number is expected to decrease at a rate
of 1.9% per year. In 10 years, if this information is correct then what is the best
prediction of the number of people driving gas powered cars? Round answer to a
whole number. Do not include units.
Using the concept of exponential decay, the predicted number of people is 233,176,000
What is the best prediction of the number of people driving gas powered cars?To predict the number of gas-powered cars on the road in 10 years, we'll apply the given annual decrease rate of 1.9% to the initial count of 286 million.
First, let's calculate the decrease rate per year:
Decrease rate = 1.9% = 1.9/100 = 0.019
Next, we'll calculate the predicted count after 10 years using the formula for exponential decay:
Predicted count = Initial count * (1 - Decrease rate)^Number of years
Substituting the values:
Predicted count = 286 million * (1 - 0.019)^10
Calculating the value:
Predicted count ≈ 286 million * (0.981)^10
Rounding the answer to the nearest whole number:
Predicted count ≈ 286 million * 0.816
Predicted count ≈ 233,176,000
Therefore, the best prediction for the number of people driving gas-powered cars in 10 years, based on the given information, is approximately 233,176,000.
Learn more on exponential decay here;
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