The fixed point of the function f(x) = x^2 + 1 is c = 0.
f(x) = x^2 + 1
c = 0
To find the fixed point of the function f, we can set the equation f(x) = x^2 + 1 equal to x, since the fixed point is when f(x) is equal to x.
Therefore, we can solve for x by setting x^2 + 1 = x. Re-arranging the equation, we get x^2 - x + 1 = 0.
Using the quadratic formula, x = (-(-1) ± √(1 - 4(1)(1))/(2(1))
Simplifying this expression, x = (-1 ± √3)/2.
Since we are looking for a real number, we can eliminate the negative solution and set x = (1 + √3)/2.
Therefore, the fixed point of the function f is c = 0.
The fixed point of the function f(x) = x^2 + 1 is c = 0.
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Prove divisibility
thanks!
The prove that the given expression is divisible by 43 is explained below.
Divisibility of numbers.A number is said to be divisible by a given number when it leaves no remainder after the division. Example; show that 7^7 is divisible by 49.
7^7 = 823543
So that;
823543/ 49 = 16807
To prove that the expression is divisible by 43, we have;
7^8 = 5764801
7^7 = 823543
7^6 = 117649
Then,
7^8 - 7^7 + 7^6 = 5764801 - 823543 + 117649
= 4941258 + 117649
= 5058907
Then,
5058907/ 43 = 117649
Thus the expression is divisible by 43.
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A student decides to finance a used car over a 5-yr (60-month) period. After making a down
payment of $2000, the remaining cost of the car including tax and interest is $14,820. The
amount owed y = A(t) (in $) is given by A(t) = 14,820-247t, where t is the number of
months after purchase and 0 ≤t≤ 60. Determine the t-intercept and y-intercept and interpret
their meanings in context.
Answer:The t-intercept of a function is the point at which the function crosses the t-axis. To find the t-intercept of the function A(t) = 14,820 - 247t, we need to find the value of t when A(t) = 0. Setting A(t) = 0 and solving for t, we get:
14,820 - 247t = 0
t = (14820/247)
The t-intercept of the function is 60 months, which means that after 60 months (or 5 years) the amount owed on the car will be $0.
The y-interval of a function is the point at which the function crosses the y-axis. To find the y-intercept of the function A(t) = 14,820 - 247t, we need to find the value of A(t) when t = 0.
At t = 0, A(t) = 14,820 - 247(0) = 14,820.
The y-intercept of the function is $14,820 which means that before making the first payment, the cost of the car including tax and interest is $14,820.
Step-by-step explanation:
Consider the system y' + 4y = f(t), where f(t) = 4e^-t a. Solve the ODE with y(0) = 0 using the technique of integrating factors: (Do not use Laplace transforms ) y(t) = ...?b. Find the transfer function of the system: H(s) = ...?c. Find the impulse response of the system: h(t) = L^-1 [H](t) d. Evaluate the convolution integral (h*f)(t) , and compare the resulting function with the solution obtained in part (a): (h*f)(t) = ∫ dw =
The result of the convolution integral is the same as the solution obtained in part (a).
a. Solving the ODE with y(0) = 0 using integrating factors,
multiplying both sides of the equation by e^4t, we get
e^4t y' + 4e^4t y = 4e^-te^4t
Integrating both sides,
∫ (e^4t y' + 4e^4t y) dt = ∫ 4e^-te^4t dt
Therefore,
e^4t y = ∫ 4e^-te^4t dt + C
Since y(0) = 0, C = 0,
y = 1/4 ∫ 4e^-te^4t dt
Using integration by parts,
y = 1/4 [te^-t + 4/3 e^-t]
Therefore,
y(t) = 1/4 [te^-t + 4/3 e^-t]
b. The transfer function of the system is given by
H(s) = Y(s)/F(s) = 1/4s/(s+4)
c. The impulse response of the system is given by
h(t) = L^-1[H(s)] = 1/4e^-t
d. The convolution integral (h*f)(t) can be evaluated as follows,
(h*f)(t) = ∫ h(t-w)f(w)dw
= ∫ 1/4e^-(t-w) 4e^-w dw
= 1/4 ∫ 4e^-(t+w) dw
= 1/4 [te^-t + 4/3 e^-t]
The result of the convolution integral is the same as the solution obtained in part (a).
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I need help Asap!!!!!!!!!
Solve: 9log9(4)=
Answer: 34.3527303398
Step-by-step explanation: hope it is right
What is the distance between (4,-2), (0,4)
Answer:
the distance between (4,-2) and (0,4) is √(52) or approximately 7.2 units.
Step-by-step explanation:
To find the distance between two points in a Cartesian coordinate plane, we can use the distance formula:
distance = √((x2-x1)² + (y2-y1)²)
In this case, the two points are (4,-2) and (0,4). So,
x1 = 4, y1 = -2 and x2 = 0, y2 = 4
By substituting these values in the distance formula, we get:
distance = √((0-4)² + (4-(-2))²)
distance = √((-4)² + 6²)
distance = √(16 + 36)
distance = √(52)
So the distance between (4,-2) and (0,4) is √(52) or approximately 7.2 units.
Set up the integral to find the area of the region inside the circle
(x−1)^2+y^2=1
and outside the circle x^2+y^2=1. [Hint: First sketch the region of integration. Next convert the equations to polar coordinates. Use these equations to solve for their intersection points, this will give you the bounds to set up the integral.]
The area of the region inside the circle (x−1)^2+y^2=1 and outside the circle x^2+y^2=1 is 4.
The area of the region inside the circle (x−1)^2+y^2=1 and outside the circle x^2+y^2=1 can be calculated using polar coordinates.
The equation of the inner circle in polar coordinates is r_1^2=1+2cosθ and the equation of the outer circle in polar coordinates is r_2^2=1.
The intersection points of the two circles can be found at θ=±π/3.
The area of the region can be calculated using the integral:
Area=∫_π/3^-π/3 (1+2cosθ)dθ=(2+4sinθ)|_π/3^-π/3=(2+4sin(-π/3))-(2+4sin(π/3))=4.
Therefore, the area of the region is 4.
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Each marble bag sold by Lena's Marble Company contains 5 red marbles for every 8 blue marbles. If a bag has 40 blue marbles, how many red marbles does it contain?
Answer:25
Step-by-step explanation:
40 multiple by 5 over 8 cross multiplication
If You write all numbers from 30 to 65 including 30 and 65 how many numbers did you write
Numbers written from 30 to 65 including 30 and 65 = 36 numbers
What is number?A number is a basic component of mathematics. Numbers are used for counting, measuring, keeping things in order, indexing, etc. We have different types of numbers based on their properties such as natural numbers, whole numbers, rational and irrational numbers, integers, real numbers, complex numbers, even and odd numbers, etc.
Given,
Numbers 30 to 65
30, 31, 32, 33, 34, 35, 36, 37, 38, 39, 40, 41, 42, 43, 44, 45, 46, 47, 48, 49, 50, 51, 52, 53, 54, 55, 56, 57, 58, 59, 60, 61, 62, 63, 64, 65
Total count of numbers 30 to 65 = 36
Hence, 36 numbers are written from 30 to 65 including 30 and 65.
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Robert enters data for weight (in pounds) and calories burned per minute into a statistics software package and finds a regression equation of ŷ = 2.2 + 0.05x, where weight is the explanatory variable. Based on this information, select the conclusion about weight and calories burned per minute that is TRUE.
Based on this information, the conclusion about weight and calories burned per minute that is true is: D. For each additional pound of weight, calories burned per minute increases by 0.05 calories.
What is the slope-intercept form?In Mathematics, the slope-intercept form of a line can be represented or modeled by using this linear equation:
y = mx + c
Where:
m represents the slope.c represents the y-intercept.x and y are the data points.Based on the information provided about the data for weight (in pounds) and calories burned per minute, a regression equation that models the situation is given by:
ŷ = 2.2 + 0.05x
Where:
ŷ is the calories.x is the pounds of weight.In conclusion, we can logically deduce that the amount of calories burned per minute increases by 0.05 calories for each additional pounds of weight.
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Complete Question:
a.) For each additional pounds of weight, calories burned per minute increases by 2.2 calories.
b.) For each additional pounds of weight, calories burned per minute stays relatively the same.
c.) For each additional pounds of weight, calories burned per minute decreases by 0.05 calories.
d.) For each additional pounds of weight, calories burned per minute increases by 0.05 calories.
Please help me please
Taking w as the unknown number, the equation for the given statement is 2(w-8) = 5.
To solve this problem, we need to convert the given statement in mathematical form.
We assume that "w" is the unknown number in the equation.
First, we have to take a closer look at the given statement. It was stated that "twice the different of... is equal to 5". It shows that the result of equation 5 is the double value of another equation. We assume the unknown equation as y. Then:
2y = 5
Next, the rest of the statement stated that "a number and 8". From this part of statement, we know that the unknown equation "y" we assume above should be replace with "w-8". Hence:
2(w - 8) = 5
If we want to solve this question, we can solve it by dividing both sides with 2:
2(w - 8) = 5
------------------- : 2
w - 8 = 5/2
w = 5/2+ 8
w = 10.5
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Among recent graduates of mathematics departments, half intend to teach high school. A random sample of size 2 is to be selected from the population of recent graduates. a. If mathematics departments had only four recent graduates total, what is the chance that the sample will consist of two graduates who intend to teach high school? b. If mathematics departments had 10 million recent graduates, what is the chance that the sample will consist of two graduates who intend to teach high school? c. Are the selections technically independent in part a? Are they technically independent in part b? In which part can you assume independence anyway? Why?
In part a, since the population mean is small, selections are independent and can be assumed to be so. In part b, the population size is too large for selections to be independent, so independence can not be assumed.
a. If mathematics departments had only four recent graduates total, the chance that the sample will consist of two graduates who intend to teach high school is
0.5 * 0.5
= 0.25.
b. If mathematics departments had 10 million recent graduates, the chance that the sample will consist of two graduates who intend to teach high school is
0.5 * 0.5
= 0.25.
c. The selections are technically independent in part a, since the population size is small enough that the selection of one person will not affect the probability of selecting the other person. The selections are not technically independent in part b, since the population size is so large that selecting one person affects the probability of selecting the other person. In part a, you can assume independence since the population size is small enough that it is reasonable to assume that the selections are independent. In part b, you cannot assume independence since the population size is too large to make this assumption.
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A bookstore had 84 copies of a magazine. Yesterday it sold 1/6 of them today it sold 4/7 of what remained. How many copies does the bookstore have left? Answer?
The bookstore has 30 copies of books left after they sold (4/7)th today.
What is a fraction?A fraction is written in the form of p/q, where q ≠ 0.
Fractions are of two types they are proper fractions in which the numerator is smaller than the denominator and improper fractions where the numerator is greater than the denominator.
Given, A bookstore had 84 copies of a magazine.
Yesterday it sold 1/6 of them which is, (84 - (1/6)×84).
= 84 - 14 books remaining.
= 70 books remaining.
Today it sold 4/7 of what remaining which is,
= (70 - (4/7)×70).
= 70 - 40.
= 30 books.
So, Now the bookstore has 30 books left.
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Mariah made a cylinder out of clay that had a radius of 6 cm and a volume of 72π cm^3. She painted the entire surface of the cylinder purple. How many square centimeters of the cylinder
did Mariah paint in terms of π?
Enter the correct answer in the box in terms of π.
answer: _______ cm squared
The number of square centimeters of the cylinder that Mariah painted is given as follows:
36π cm².
How to obtain the volume and the surface area of a cylinder?The volume of a cylinder of radius r and height h is given by the equation presented as follows:
V = πr²h.
Mariah made a cylinder out of clay that had a radius of 6 cm and a volume of 72π cm^3, hence the height of the cylinder is obtained as follows:
36πh = 72π
h = 2.
The surface area of a cylinder is obtained as follows:
S = 2π r h + 2π r
Hence it's value is of:
S = 2π x (2 x 6 + 6)
S = 36π cm².
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12. Hydrology A reservoir has a capacity of 9000 cu ft. How long will it take
to fill the reservoir at the rate of 250 gallons per minute?
It will take approximately 270.28 minutes, or 4 hours and 30.28 minutes, to fill the reservoir at a rate of 250 gallons per minute.
How to calculate the time it takes to fill a reservoir?we can use the formula:
time = volume ÷ flow rate
where volume is the capacity of the reservoir in cubic feet and flow rate is the rate at which the reservoir is filled in cubic feet per minute.
Since the capacity of the reservoir is given in cubic feet and the flow rate is given in gallons per minute, we need to convert the flow rate to cubic feet per minute. One gallon is equal to 0.133681 cubic feet, so:
250 gallons/minute x 0.133681 cubic feet/gallon = 33.342 cubic feet/minute
So the flow rate in cubic feet per minute is 33.342. Now we can calculate the time it takes to fill the reservoir:
time = 9000 cubic feet ÷ 33.342 cubic feet/minute = 270.28 minutes
So it will take approximately 270.28 minutes, or 4 hours and 30.28 minutes, to fill the reservoir at a rate of 250 gallons per minute.
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If ‘a’ varies jointly with ‘b’ and ‘c’, and inversely as the square of ‘d’, how would ‘a’ be affected if ‘b’ is tripled and both ‘c’ and ‘d’ are doubled.
When two or more variables vary jointly, their product is always constant. In this case, if 'a' varies jointly with 'b' and 'c' it means that their product is always constant, so abc = k, where k is a constant value.
When a variable 'a' varies inversely as the square of another variable 'd', it means that a*1/d^2 = k, where k is a constant value.
So, if 'b' is tripled, 'c' is doubled and 'd' is doubled, we can see the effect on 'a' by substituting the new values into the equations.
abc = k => a3b2c = k
a1/d^2 = k => a1/(2d)^2 = k
So the effect on 'a' if 'b' is tripled, 'c' is doubled, and 'd' is doubled is that it will be divided by 4.
a3b2c = a1/(2d)^2 => a = k / (3b2c*(2d)^2) = (k/(12bcd^2))
So a = k/(12bcd^2) = a/4.
Therefore, the value of 'a' is decreased by a factor of 4.
use the graphs to determine the intervals on which the functions are increasing, decreasing, or constant
For the first graph, the function is increasing when the graph is sloping upwards, which is the case between the points (-1,1) and (1,3). For the second graph, the function is increasing when the graph is sloping upwards, which is the case between the points (0,2) and (2,4).
For the first graph, the function is increasing from interval (-1,1) and decreasing from interval (1,3).
For the second graph, the function is increasing from interval (0,2) and decreasing from interval (2,4).
For the first graph, the function is increasing when the graph is sloping upwards, which is the case between the points (-1,1) and (1,3). This indicates that the function is increasing on the interval (-1,1). Similarly, the function is decreasing when the graph is sloping downwards, which is the case between the points (1,3) and (3,1). This indicates that the function is decreasing on the interval (1,3).
For the second graph, the function is increasing when the graph is sloping upwards, which is the case between the points (0,2) and (2,4). This indicates that the function is increasing on the interval (0,2). Similarly, the function is decreasing when the graph is sloping downwards, which is the case between the points (2,4) and (4,2). This indicates that the function is decreasing on the interval (2,4).
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What is the Probability.
The value of the conditional Probability is P(A|B) is 1/3.
What is probability ?The area of mathematics known as probability deals with numerical representations of the likelihood that an event will occur or that a statement is true. An event's probability is a number between 0 and 1, where, broadly speaking, 0 denotes the event's impossibility and 1 denotes certainty.
The main distinction between a probability and a conditional probability is that a probability is the likelihood of an event, such as A, occurring, whereas a conditional probability assumes that another event, such as B, has already happened in order to define the probability of an event, such as in the conditional probability of A given B.
Conditional probability is the likelihood that any event A will occur in the presence of another event B that is related to A. P(A|B) illustrates it.
By, Conditional Probability :
P (A∩B) =P (A∩B') - P(B)= 4/9 - 1/3 = 1/9
P(A|B) = P (A∩B)/ P(B)
= (1/9)/(1/3) = 1/3
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Ten less than twice a number is equal to at least 52. What are all the possible values of the number? Write an inequality so that X term comes first.
The inequality equation which represents Ten less than twice a number is equal to at least 52 is 10 - 2x ≥ 52 and x ≤ -21
How to write and solve inequality?Let
The unknown number = x
Ten less than twice a number is equal to at least 52;
10 - 2x ≥ 52
Subtract 10 from both sides
- 2x ≥ 52 - 10
- 2x ≥ 42
divide both sides by - 2
x ≤ 42/-2
x ≤ -21
Hence, x ≤ -21 is the solution to the inequality 10 - 2x ≥ 52 if x comes first.
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The logarithmic functions, f(x) and g(x), are shown on the graph.
What is the equation that represents g(x)? Explain your reasoning.
The image of the function after the translation is g(x) = log(x + 1) + 4
What is graph?In mathematics, the graph of a function f is the set of ordered pairs, where {\displaystyle f(x)=y.} In the common case where x and f(x) are real numbers, these pairs are Cartesian coordinates of points in two-dimensional space and thus form a subset of this plane.
here, we have,
f(x)=logx
How to determine the equation of g(x)?
From the graph, the given parameters are:
f(x) = log(x)
From the graph, we can see that:
The graph of f(x) is translated left by 1 unit
The graph of f(x) is translated up by 4 units
This transformation is given as
g(x) = f(x + 1) + 4
Mathematically, this transformation can be represented as
(x, y) = (x + 1, y + 4)
When represented as a function, we have
g(x) = f(x + 1) + 4
Substitute the equation f(x) = log(x)
f(x + 1) = log(x + 1) + 4
So, we have the following equation
g(x) = log(x + 1) + 4
Hence, the equation of g(x) is g(x) = log(x + 1) + 4
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Solve:
7x+5(x-1)=-5+12x
please show work!
The solution for the given equation; 7x+5(x-1)=-5+12x as required to be determined is; Infinitely many solutions.
What is the solution for the given equation; 7x+5(x-1)=-5+12x?It follows from the task content that the solution for the given equation; 7x+5(x-1)=-5+12x is to be determined.
Since the given equation is; 7x + 5 (x-1) = -5 + 12x
Hence, by the distributive property; we have that;
7x + 5x - 5 = -5 + 12x
12x - 5 = 12x - 5
On this note, since both sides of the equation are same, it follows that the equation has infinitely many solutions.
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Write the expression in exponential form. 9×9×9×9x9x9x9=|
its 9 of the 7th power
its also 9^7
Answer:
(9)^7
Step-by-step explanation:
All you have to do is count how many 9's you have, and the number you get will be the (power)
Put (9) as the base and then add the power
Which gives us (9)^7
[tex] {9}^{7} [/tex]
One measure of the accuracy of a forecasting model is the:
a. trend component
b. mean absolute deviation
c. seasonal index
d. smoothing constant
Mean Absolute Deviation (MAD) is a measure of accuracy for a forecasting model.
It measures the average distance between the actual value and the predicted value, and can be calculated using the following formula: MAD = 1/n * Σ |Ai-F i |, where n is the number of data points, Ai is the actual value, and Fi is the forecasted value. MAD is often used to compare the accuracy of different forecasting models. A lower MAD value indicates that the model has a better accuracy in predicting future values. Additionally, MAD can also be used to measure the accuracy of a single forecasting model over time. If MAD increases, then the accuracy of the forecasting model is decreasing.
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We know 15 x 3 = 45.
So, which of the following statements are also true?
Choose all answers that apply
D) 3 is a multiple of 45
C) 15 is a factor of 45
E) All of the Above
B) 45 is a multiple of 15
A) 45 is a factor of 15
Answer:
B, C
Step-by-step explanation:
A) No, factors of 15 = 1, 3, 5, 15... so 45 is not a factor of 15
B) yes, 45 is the third multiple of 15 ( 15×3=45)
C) yes, factor of 45 is the number that divides 45 without leaving any remainders (45÷15=3), therefore 15 is a factor of 45
D) No, multiples must be bigger in value than the actual number because( a multiple of 45) means, the number we get when we multiply 45 by an integer... Here we can't multiply an integer by 45 and get the answer 3
when the fraction 1/70000000 is written as a decimal, which digit occurs i the 2023 place after the decimal point
The decimal representation of 1/70000000 is 0.0000000142857142857....
In math, what is a fraction?
An element of a whole is a fraction. The number is represented mathematically as a quotient, where the numerator and denominator are split. Both are integers in a simple fraction. A fraction appears in the numerator or denominator of a complex fraction. The numerator of a proper fraction is less than the denominator.
To find the digit that occurs in the 2023rd place after the decimal point, we can use long division to divide 1 by 70000000 and track the remainders.
Since the decimal representation of 1/70000000 is repeating every 6 digits, we can find the digit at the 2023rd place by taking the remainder when 2023 is divided by 6.
2023 % 6 = 1
So the digit in the 2023 place is the first digit after the repeating decimal, which is 4.
Therefore the digit in the 2023rd place after the decimal point is 4.
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please i need help with steps
The total distance ran by the wide receiver is given as follows:
195.6 yd.
How to obtain the distance between two points?Suppose that we have two points with coordinates given as follows:
[tex](x_1, y_1)[/tex] and [tex](x_2, y_2)[/tex]
Then the formula for the distance between these two points is given as follows:
[tex]D = \sqrt{(x_2-x_1)^2+(y_2-y_1)^2}[/tex]
For the out route, the distance is given as follows:
[tex]D = \sqrt{(60 - 30)^2+(50 - 20)^2} = 42.43[/tex]
To the end zone, the distance is given as follows:
[tex]D = \sqrt{(60 - 80)^2+(50 + 30)^2} = 82.46[/tex]
From the end zone back to the huddle, the distance is given as follows:
[tex]D = \sqrt{(80 - 30)^2+(-30 - 20)^2} = 70.71[/tex]
Hence the total distance is of:
42.43 + 82.46 + 70.71 = 195.6 yd.
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what is the mid point of (3.5,2,2) (1.5,-4.8)
The above equation's midpoint is represented by the expression Midpoint = (3.5,2,2) (1.5,-4.8). ( 2.5,-1.3 )
What do you meant by mid point ?Midpoint =( 2.5,-1.3 )
The formula for determining the midpoint is
[tex]$\left(x_m, y_m\right)=\left(\frac{x_1+x_2}{2}, \frac{y_1+y_2}{2}\right)$[/tex]
[tex]$\left(x_m, y_m\right)=$[/tex]the midpoint's coordinates
[tex]$\left(x_1, y_1\right)=$[/tex] the first point's coordinates
[tex]$\left(x_2, y_2\right)=$[/tex] the second point's coordinates
Divide the distance between the two endpoints by 2, then multiply it by 3. The middle of that line is at these distances from each end. As an alternative, multiply the sum of the two endpoints' x coordinates by 2. For the y coordinates, repeat the process. the location on a line when the distances to both ends are equal. a period of time midway between the start and finish of an event.
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two triangles triangle abc and triangle abd sit inside a circle with a diameter, represented by the line ab, equal to 8. which of the following statements regarding angle 1 (angle acb) and angle 2 (angle abd) is correct?
A line segment is a piece of a line that can connect two places. Hence ar (ABC) = ar (ABD)
What is line-segment?A line segment is a piece of a line that can connect two places. The following diagrams can help us grasp the line segment: A line like this! It stretches eternally in both directions and has no ends. It becomes a line segment when you mark the two points A and B on it and choose this segment independently. It is described as a long, continuous, straight line that is illustrated by arrowheads pointing in both directions. Both directions are covered by its reach. Line Segment: A line segment is a section of a straight line that runs between two locations.Given
[tex]$\triangle \mathrm{ABC}$[/tex] and [tex]$\triangle \mathrm{ABD}$[/tex] are two triangles on the same base [tex]$\mathrm{AB}$[/tex].
To show :
ar(ABC)=ar(ABD)
Proof :
Since the line segment [tex]$\mathrm{CD}$[/tex] is bisected by [tex]$\mathrm{AB}$[/tex] at [tex]$\mathrm{O}[/tex] . [tex]\mathrm{OC}=\mathrm{OD}$[/tex].
In [tex]$\triangle \mathrm{ACD}$[/tex], We have [tex]$\mathrm{OC}=\mathrm{OD}$[/tex].
So, [tex]$\mathrm{AO}$[/tex] is the median of[tex]$\triangle \mathrm{ACD}$[/tex]
Also we know that median divides a triangle into two triangles of equal areas.
∴ar(ΔAOC)=ar(ΔAOD) _______ (1)
Similarly , In[tex]$\triangle \mathrm{BCD}$[/tex],
[tex]$\mathrm{BO}$[/tex]is the median. ([tex]$\mathrm{CD}$[/tex] bisected by [tex]$\mathrm{AB}$[/tex] at [tex]$\mathrm{O}$[/tex])
∴ar(ΔBOC)=ar(ΔBOD) _______ (2)
On adding equation (1) and (2) we get,
ar(ΔAOC)+ar(ΔBOC)=ar(ΔAOD)+ar(ΔBOD)
∴ar(ΔABC)=ar(ΔABD)
The complete question is,
In figure, ABC and ABD are two triangles on the same base AB. If line-segment CD is bisected by AB at O, show that ar (ABC) = ar (ABD).
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Out of 300 people sampled, 60 preferred Candidate A. Based on this, estimate what proportion of the voting population ( p ) prefers Candidate A. Use a 95% confidence level, and give your answers as decimals, to three places.
___ < p < ___
At 95% confidence level, the proportion will be between .0.19912815 and 0.200086, when you have a mean of 0.2 and a standard error of 0.00053.
How do you calculate population proportion?
P′ is equal to x / n, where x is the total number of successes and n is the sample size. As a point estimate for the genuine population proportion, the variable p′ represents the sample proportion.
FPC = (N-n)/(N-1), where Z/2 is the critical value of the Normal distribution at /2, p is the sample proportion, n is the sample size, and N is the size of the population (for example, at a confidence level of 95%, is 0.05 and the critical value is 1.96).
A portion of a population that possesses a certain characteristic, given as a percentage, fraction, or decimal of the entire population. The population percentage for a finite population is equal to the population's size divided by the proportion of its members who possess a given attribute.
Given data :
p = 60 / 300 = 0.2
q = 1 - p = 0.8
mean proportion = p = .2
standard error = sqrt(p * (1-p / 300) = sqrt(0.2 * 0.8/ 300) =0.00053333333
critical z-score at 95% confidence level is plus or minus 1.645.
use the z-score formula to find the critical raw score.
for the low side, z = (x - m) / s becomes:
-1.645 = (x - 0.2) / 0.00053
solve for x to get:
x = -1.645 * 0.00053 + 0.2 = 0.19912815
for the high side, z = (x - m) / s becomes:
1.645 = (x - 0.2) / 0.00053
solve for x to get:
x = 1.645 * 0.00053 + 0.2 = 0.200086125
At 95% confidence level, your proportion will be between .0.19912815 and 0.200086, when you have a mean of 0.2 and a standard error of 0.00053.
Here's what it looks like on a z-score normal distribution calculator output.
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Which figure is a quadrilateral?
Answer:
The rectangle (option 2)
Step-by-step explanation:
A quadrilateral is any enclosed polygon with four sides. Only the rectangle (option 2) is a quadrilateral.
The other options are not quadrilaterals because they don't have four sides (options 1 and 3) or are not enclosed (option 4). Hope this helps!
If a coin is flipped 60 times and a head comes up 42 times, what is the
relative frequency of a head coming up?
A. 0.60
B. 0.55
C. 0.65
D. 0.70
Answer: D. 0.70
Step-by-step explanation:
42/60= 0.7