No, these two matrices are not equal.
The first matrix is a 3x3 matrix with the elements [[3,-1,7],[2,6,-9],[-5,4,-2]] and the second matrix is also a 3x3 matrix with the elements [[-2,-9,7],[4,6,-1],[-5,2,3]]. In order for two matrices to be equal, they must have the same dimensions and the corresponding elements must be equal. In this case, the dimensions are the same, but the corresponding elements are not equal. For example, the first element in the first matrix is 3, but the first element in the second matrix is -2. Therefore, these two matrices are not equal.
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Check all that applies please GIVING HIGH POINTS ANSWER FAST
Answer:
-1
Step-by-step explanation:
qwertyuoiplaksjdhfgmznxbcvqwertyuoiplaksjdhfgmznxbcvqwertyuoiplaksjdhfgmznxbcvqwertyuoiplaksjdhfgmznxbcvqwertyuoiplaksjdhfgmznxbcvqwertyuoiplaksjdhfgmznxbcv
Fill in each blank with a number or expression such that each row and column adds up to the same total.
The blanks are filled by the following
8-3x 3x-6 4x-5 -2x+5
2x-3 3 2-x x
1-2x 4x-1 3x-2 -3x+4
5x-4 6-5x -4x+7 6x-7
How to fill the blanksThe blanks are filled by adding the complete row, this will be used for comparison and solve for other missing spaces.
let the missing value in each case be y
Adding the complete row gives
2x - 3 + 3 + 2 - x + x = 2x + 2
Column 1
8 - 3x + 2x - 3 + 1 - 2x + y = 2x + 2
6 - 3x + y = 2x + 2
y = 5x - 4
Column 2
y + 3 + 4x - 1 + 6 - 5x = 2x + 2
y + 8 - x = 2x + 2
y = 3x - 6
Row 4
5x - 4 + 6 - 5x + y + 6x - 7 = 2x + 2
6x - 5 + y = 2x + 2
y = -4x + 7
Column 3
y + 2 - x + 3x - 2 - 4x + 7 = 2x + 2
y + 7 - 2x = 2x + 2
y = 4x - 5
Row 1
8 - 3x + 3x - 6 + 4x - 5 + y = 2x + 2
-3 + 4x + y = 2x + 2
y = -2x + 5
Row 3
1 - 2x + 4x - 1 + 3x - 2 + y = 2x + 2
5x - 2 + y = 2x + 2
y = -3x + 4
check
This should be equal to Row 1 which is y = -2x + 5
Column 4
y + x - 3x + 4 + 6x - 7 = 2x + 2
y + 4x - 3 = 2x + 2
y = -2x + 5
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A local county has an unemployment rate of 6.5%. A random sample of 20 employable people are picked at random from the county and are asked if they are employed. The distribution is a binomial. Round answers to 4 decimal places. a) Find the probability that exactly 3 in the sample are unemployed. b) Find the probability that there are fewer than 3 in the sample are unemployed. c) Find the probability that there are more than 2 in the sample are unemployed. d) Find the probability that there are at most 3 in the sample are unemployed.
The distribution is binomial.
a) The probability that exactly 3 in the sample are unemployed is 0.0311, b) The probability that there are fewer than 3 in the sample are unemployed is 0.5354, c) The probability that there are more than 2 in the sample are unemployed is 0.4646, d) The probability that there are at most 3 in the sample are unemployed is 0.5665.
The binomial distribution formula is P(x) = (nCx)(p^x)(q^(n-x)), where n is the number of trials, x is the number of successes, p is the probability of success, and q is the probability of failure.
a) To find the probability that exactly 3 in the sample are unemployed, we plug in the values: n = 20, x = 3, p = 0.065, and q = 0.935.
P(3) = (20C3)(0.065^3)(0.935^17) = 1140(0.000274625)(0.099961375) = 0.0311
b) To find the probability that there are fewer than 3 in the sample are unemployed, we need to find the probability that 0, 1, or 2 are unemployed and add them together.
P(0) = (20C0)(0.065^0)(0.935^20) = 1(1)(0.1645) = 0.1645
P(1) = (20C1)(0.065^1)(0.935^19) = 20(0.065)(0.1725) = 0.2249
P(2) = (20C2)(0.065^2)(0.935^18) = 190(0.004225)(0.1812) = 0.1460
P(<3) = P(0) + P(1) + P(2) = 0.1645 + 0.2249 + 0.1460 = 0.5354
c) To find the probability that there are more than 2 in the sample are unemployed, we can subtract the probability that there are fewer than 3 from 1.
P(>2) = 1 - P(<3) = 1 - 0.5354 = 0.4646
d) To find the probability that there are at most 3 in the sample are unemployed, we can add the probabilities that there are 0, 1, 2, or 3 unemployed.
P(≤3) = P(0) + P(1) + P(2) + P(3) = 0.1645 + 0.2249 + 0.1460 + 0.0311 = 0.5665
Therefore, the answers are:
a) 0.0311
b) 0.5354
c) 0.4646
d) 0.5665
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You need a home loan of $65,000 after your down payment. How much will your monthly house payment be in the bank charges 6.25% APR for a loan of 15 years?( simplify your answer completely. Round your answer to the nearest cent)
Your monthly house payment given that the bank charges 6.25% APR for a loan of 15 years will be $51.95.
To find the monthly house payment for a loan of $65,000 with a 6.25% APR for 15 years, we can use the formula:
M = P [ i(1 + i)^n ] / [ (1 + i)^n - 1]
Where:
M = monthly payment
P = principal amount
i = monthly interest rate
n = number of monthly payments
First, we need to find the monthly interest rate and the number of monthly payments:
i = 6.25% / 12 = 0.00625
n = 15 years(12 months/year) = 180 months
Now we can plug these values into the formula:
M = 65,000 [ 0.00625(1 + 0.00625)^180 ] / [ (1 + 0.00625)^180 - 1]
M = 65,000 [ 0.00625(1.00625)^180 ] / [ (1.00625)^180 - 1]
M = 65,000 [ 0.024636 ] / [ 0.171184 ]
M = 65,000 [ 0.143875 ]
M = 9,351.88
So, the monthly house payment will be $9,351.88 / 180 = $51.95.
Therefore, the monthly house payment for a loan of $65,000 with a 6.25% APR for 15 years will be $51.95.
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Quadrilateral ABCD is inscribed in a circle.
What is the measure of angle A?
Enter your answer in the box.
m/A=
The measure of ∠A is 77 degrees.
What is Circle?A round-shaped figure that has no corners or edges is called as Circle.
ABCD is the quadrilateral which is inscribed in the circle.
We have to find angle A measure.
The opposite angles of a cyclic quadrilateral are supplementary so we apply to find the measure.
Therefore, angle A + angle C = 180 degrees
2x+9+3x+1=180
5x+10=180
Subtract 10 from both sides
5x=170
Divide both sides by 5
x=34
Now plug in x value in angle A, 2x+9.
∠A=2x+9
=2(34)+9
=68+9
=77 degrees.
Hence, the measure of ∠A is 77 degrees.
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How do I solve this?
Answer: you probly need to find the root of the number 8
Step-by-step explanation:
A sandwich shop makes home deliveries. The average amount of time from when an order is placed until when it is delivered can be modeled by the equation y = 2.5x + 5, where x is the number of miles between the shop and the delivery location and y is the time in minutes. Which of these statements are correct according to the model? Select two that apply.
The correct statements according to the model are: if the delivery location is 0 miles away, the order will take 5 minutes to be delivered, and if the delivery location is 10 miles away, the order will take 30 minutes to be delivered.
What is statements ?
A statement is a sentence that expresses a complete thought and can be either true or false. In mathematics, statements are often used to make claims or propositions that can be proven or disproven using logical reasoning and evidence.
The equation y = 2.5x + 5 models the average amount of time from when an order is placed until when it is delivered for a sandwich shop that makes home deliveries, where x is the number of miles between the shop and the delivery location, and y is the time in minutes.
To answer the question, we need to look at the statements and see which ones are correct according to the model:
If the delivery location is 0 miles away, the order will take 5 minutes to be delivered.
This statement is true because if x=0, then y=2.5(0)+5=5, which means the order will take 5 minutes to be delivered.
If the delivery location is 10 miles away, the order will take 30 minutes to be delivered.
This statement is true because if x=10, then y=2.5(10)+5=30, which means the order will take 30 minutes to be delivered.
If the delivery location is 1 mile away, the order will take 2.5 minutes to be delivered.
This statement is false because if x=1, then y=2.5(1)+5=7.5, which means the order will take 7.5 minutes to be delivered, not 2.5 minutes.
If the delivery location is 5 miles away, the order will take 20 minutes to be delivered.
This statement is false because if x=5, then y=2.5(5)+5=17.5, which means the order will take 17.5 minutes to be delivered, not 20 minutes.
Therefore, the correct statements according to the model are: if the delivery location is 0 miles away, the order will take 5 minutes to be delivered, and if the delivery location is 10 miles away, the order will take 30 minutes to be delivered.
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Refer to the diagram.
N 51°
(3x)°
T
Write an equation that can be used to find the value of x.
please help
The value of x on the straight line is 43 degrees
How to determine the value of xFrom the question, we have the following parameters that can be used in our computation:
The straight line
The sum of angles on a straight line is 180 degrees
Using the above as a guide, we have the following equation
3x + 51 = 180
Evaluate
3x = 129
Divide by 3
x = 43
Hence, the value of x is 43 degrees
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Does anyone knows this Central Angle
The value of x is
x=-5
What is The value of x?
Generally, An angle is a figure formed by two rays (or line segments) that share a common endpoint. Angles are usually measured in degrees, with a full angle measuring 360 degrees.
Considering that the angle on a point is 630 , we have that the missing angle is
y=360-(148+92)
y=120
Therefore
y=x+125
Hence
x=y-125
x=120-125
x=-5
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Graph the solution to the inequality on the number line.
|4y+8| <4
Answer:
-3 < y < -1
Step-by-step explanation:
|4y+8| < 4 |4y+8| > -4
4y + 8 < 4 4y + 8 > -4
4y < -4 4y > -12
y < -1 y > -3
So, the answer is -3 < y < -1
1/2 + a = 1 3/4 = 7
1/2 + ? = 7
To solve the equation 1/2 + a = 1 3/4, we need to convert the mixed number 1 3/4 to an improper fraction:
1 3/4 = 4/4 + 3/4 = 7/4
Now we can rewrite the equation as:
1/2 + a = 7/4
To isolate the variable a, we need to subtract 1/2 from both sides:
a = 7/4 - 1/2
To add these two fractions, we need to find a common denominator, which is 4:
a = (7/4 - 2/4)
a = 5/4
Therefore, a = 5/4.
To solve the equation 1/2 + ? = 7, we can follow a similar approach. We need to isolate the variable on one side of the equation, so we need to subtract 1/2 from both sides:
? = 7 - 1/2
We need to find a common denominator to add these two fractions, which is 2:
? = (14/2 - 1/2)
? = 13/2
Therefore, the missing number is 13/2.
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Question 1 Solve the following inequality: 5(3y+1)<15 Answer in interval notation.
The solution to the inequality 5(3y+1)<15 in interval notation is (-∞, 2/3).
To solve the inequality 5(3y+1)<15, we need to isolate the variable y on one side of the inequality. Here are the steps to do so:
1. Start with the given inequality: 5(3y+1)<15
2. Distribute the 5 on the left side: 15y+5<15
3. Subtract 5 from both sides: 15y<10
4. Divide both sides by 15: y<10/15
5. Simplify the fraction: y<2/3
Now, we can write the solution in interval notation. Interval notation uses parentheses or brackets to indicate the range of values that satisfy the inequality. In this case, the solution is all values of y less than 2/3, so we use the notation (-∞, 2/3).
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8 The trinomial 4x^(2)-20x+25 is factorable. Which of these is the correct factorization? F (2x+5)(2x-5) G (2x-5)^(2) H (2x+5)^(2) J (x-5)(4x-5)
The trinomial 4x²-20x+25 is factorable. The correct factorization of the trinomial 4x²-20x+25 is H (2x+5)².
To factor a trinomial, we need to find two numbers that multiply to give the constant term (25) and add to give the coefficient of the middle term (-20). In this case, the two numbers are -5 and -5. We can then write the trinomial as (4x²-10x-10x+25), and factor by grouping:
4x²-10x-10x+25 = (4x^(2)-10x) + (-10x+25) = 2x(2x-5) - 5(2x-5) = (2x-5)(2x-5) = (2x+5)²
Therefore, the correct factorization of the trinomial is H (2x+5)²
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Divide the monomials. Is the result of division a monomial? If yes, write the monomial in standard form. -0.26a^(3)b^(6)-:(4(1)/(3)a^(3)b^(2))
The result of the division is a monomial, and it is in standard form: [tex]-0.195b^4[/tex]
The result of the division of the monomials is a monomial. To find the result, we need to divide the coefficients and subtract the exponents of the same variables.
The steps are as follows:
Divide the coefficients: -0.26 ÷ (4(1)/(3)) = -0.26 ÷ (4/3) = -0.26 × (3/4) = -0.195
Subtract the exponents of the same variables: a^(3-3) = a^0 = 1, b^(6-2) = b^4
Multiply the result of step 1 and step 2: -0.195 × 1 × b^4 = -0.195b^4
Therefore, the result of the division is a monomial, and it is in standard form: -0.195b^4.
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Set up the trigonometric ratio for right triangles that yoa would ase to fisd
x
. Yeu are aar mied ap lad
x
. 1. a. b. Find
x
to the nearest tenth of a degree. Show your wark. Set up the trigonometric ratio for right triang gkes that you would use to find
x
. You are ase aulend to find
x
, 3. a. b. 4 Approximate
x
to the nearest lenth of a degroe. 5. Consider the following right triangle. Set up the trigonometric ratio for right triangles that you would use to find
x
. Then find
x
.
The key to finding the value of x in a right triangle is to choose the appropriate trigonometric ratio based on the sides given and to use a calculator to find the value of x to the nearest tenth of a degree.
To find the value of x in a right triangle, we can use the trigonometric ratios of sine, cosine, and tangent. The ratio we choose depends on the information given in the question and the sides and angles we are trying to find.
To find x to the nearest tenth of a degree, we can use the following steps:
a. Identify the sides of the triangle that are given and the side we are trying to find.
b. Choose the appropriate trigonometric ratio based on the sides given. For example, if we are given the opposite side and the hypotenuse, we would use the sine ratio.
c. Set up the equation and solve for x. For example, if we are using the sine ratio, the equation would be sin(x) = opposite/hypotenuse.
d. Use a calculator to find the value of x to the nearest tenth of a degree.
To find x using the aulend method, we can use the following steps:
a. Identify the sides of the triangle that are given and the side we are trying to find.
b. Use the Pythagorean theorem, a^2 + b^2 = c^2, to find the missing side.
c. Use the appropriate trigonometric ratio to find the value of x.
To approximate x to the nearest tenth of a degree, we can use a calculator to find the value of x and then round to the nearest tenth.
To find x in the given right triangle, we can use the following steps:
a. Identify the sides of the triangle that are given and the side we are trying to find.
b. Choose the appropriate trigonometric ratio based on the sides given.
c. Set up the equation and solve for x.
d. Use a calculator to find the value of x.
Overall, the key to finding the value of x in a right triangle is to choose the appropriate trigonometric ratio based on the sides given and to use a calculator to find the value of x to the nearest tenth of a degree.
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Find the value of v and w using sine and cosine 5 and 71 round to the nearest tenth
The values of w and v in the given right triangle are 1.68 and 4.7
What is a right triangle?A right-angled triangle is a triangle, that has one of its interior angles equal to 90 degrees or any one angle is a right angle.
Given is a right triangle, with hypotenuse 5, and an acute angle of 71°, we need to find the value of v and w, using trigonometric ratios,
The other acute angle will be = 90°-71° = 19°
Taking 19° as reference angle,
Sin 19° = w/5
w = 1.68
Cos 19° = v/5
v = 4.7
Hence, the values of w and v in the given right triangle are 1.68 and 4.7
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Using the following regression output, test the following hypotheses. Use a=0. 1: variable coefficient constant 4. 162 units 15. 509
As our calculated t-value of 3.032 is greater than the critical value of ±1.645, we can reject the null hypothesis at the 0.1 significance level and conclude that the coefficient for the variable is statistically significant and different from zero.
The hypotheses that we want to test are:
H0: The coefficient for the variable is equal to zero.
H1: The coefficient for the variable is not equal to zero.
Using the given output, we can see that the coefficient for the variable is 15.509, and the standard error of the coefficient is 5.123. The t-value for the coefficient is calculated by dividing the coefficient estimate by its standard error, so:
t = 15.509 / 5.123 = 3.032
To test the hypothesis, we can compare the calculated t-value with the critical value of the t-distribution with n-k-1 degrees of freedom (where n is the sample size and k is the number of independent variables), at a significance level of 0.1 and using a two-tailed test.
Since the sample size and number of independent variables are not provided, we cannot determine the degrees of freedom or the critical value directly. However, we can use a t-distribution calculator or look up the critical value from a t-distribution table. For example, with n=50 and k=2 (based on the given output), the critical value for a two-tailed test at a significance level of 0.1 is approximately ±1.645.
Since our calculated t-value of 3.032 is greater than the critical value of ±1.645, we can reject the null hypothesis at the 0.1 significance level and conclude that the coefficient for the variable is statistically significant and different from zero. In other words, there is evidence to suggest that the variable has a significant effect on the outcome being predicted by the regression model.
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What innovation was made possible in part because of the Carterfone decision in 1968? Select one a. COBOL b. radiospectrum allocation c. the public Internet d. SMS
The innovation that was made possible in part because of the Carterfone decision in 1968 is the public Internet. The correct answer is option C
The Carterfone decision was a landmark ruling by the Federal Communications Commission (FCC) that allowed for the interconnection of third-party devices to the telephone network. Prior to this decision, telephone companies had a monopoly on the equipment that could be used on their networks, and customers were not allowed to attach their own devices.
This decision paved the way for the development of the public Internet by allowing for the interconnection of third-party devices to the telephone network, which enabled the creation of new technologies, such as modems. Without the Carterfone decision, the public Internet as we know it today may not have been possible.
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NTGS PRACTICE Use the distance formula d=rt to write an Kai drives 376 miles in 8 hours at a constant speed. How far does he drive in 10 hours?
Kai drives 470 miles in 10 hours at a constant speed of 47 miles per hour. To find out how far Kai drives in 10 hours, we can use the distance formula d=rt, where d is the distance, r is the rate (or speed), and t is the time.
First, we need to find Kai's rate (or speed). We can do this by rearranging the formula to solve for r:
r = d/t
Plug in the values we know:
r = 376 miles / 8 hours
Simplify:
r = 47 miles per hour
Now that we know Kai's rate, we can plug it back into the distance formula to find out how far he drives in 10 hours:
d = rt
d = (47 miles per hour) (10 hours)
Simplify:
d = 470 miles
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(a) if tan∅ = 8/15, find the value of
sin∅ + cos∅(1- cos∅) (b)The angle of elevation of the top of a radio mask from a point due east of it and 96m away from its base is 30degrees. From another point, due west of the mask, the angle of elevation of the top is 60degrees. Calculate the distance of the second point from the base of the mast.
Answer:
Below in bold.
Step-by-step explanation:
The right triangle of which ∅ is a part has
Hypotenuse = sqrt(8^2 + 15^2)
= sqrt289
= 17,
So, sin ∅ = 8/17 and cos ∅ = 15/17
and
sin∅ + cos∅(1- cos∅)
= 8/17 + 15/17(1 - 15/17)
= 8/17 + 15/17 - 225/289
= 166/289.
(b) tan 30 = h/96 where h is height of the mast
h = 96 tan 30.
= 55.4256
tan 60 = 55.4256/d where d is the required distance
d = 55.4256/ tAN60
= 32 M
I need help pls pls pls help quickly.
The lateral surface area of the cylinders {W} and {Y} are same.
What is volume?Volume is a collection of two - dimensional points enclosed by a single dimensional line. Mathematically, we can write -
V = ∫∫∫ F(x, y, z) dx dy dz
Given are the dimensions of the cylinder as shown in the image.
The lateral surface area of the cylinder is -
L.S.A = 2πrh
{ 1 } -
L.S.A {W} = 2π x 3 x 9 = 54π
{ 2 } -
L.S.A {X} = 2π x 4 x 2 = 16π
{ 3 } -
L.S.A {Y} = 2π x 4.5 x 6 = 54π
Therefore, the lateral surface area of the cylinders {W} and {Y} are same.
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Set up an algebraic equation and then solve. An integer is 14 less than 4 times another. If the product of the two integers is 30 , then find the integers. The two integers are and I don't know 2 attemp
The two integers are 5 and 6.
Set up with algebraic equationTo solve this problem, we need to set up an algebraic equation based on the information given.
Let's call the first integer x and the second integer y. According to the problem, an integer (x) is 14 less than 4 times another (y).
This can be written as: x = 4y - 14
We are also told that the product of the two integers is 30. This can be written as:
xy = 30
Now we can substitute the first equation into the second equation to solve for one of the variables.
Let's solve for y:
(4y - 14)y = 30
4y^2 - 14y = 30
4y^2 - 14y - 30 = 0
Using the quadratic formula, we can solve for y:
y = (-(-14) ± √((-14)^2 - 4(4)(-30)))/(2(4))
y = (14 ± √(196 + 480))/8
y = (14 ± √676)/8
y = (14 ± 26)/8
y = 5 or y = -1.5
Now we can plug these values of y back into the first equation to find the corresponding values of x:
x = 4(5) - 14 = 6
x = 4(-1.5) - 14 = -20
So the two integers are either 5 and 6, or -1.5 and -20. However, since the problem asks for integers, we can eliminate the second solution.
Therefore, the two integers are 5 and 6.
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Use the given function to evaluate \( f(3) \). Enter your answer with no spaces. \[ f(x)=\left\{\begin{array}{llr} -x^{2} & \text { for } & x
The answer is \( f(3) = 5 \) with no spaces.
Given the function \( f(x) = \left\{ \begin{array}{llr} -x^2 & \text{for} & x < 0 \\ x+2 & \text{for} & x \ge 0 \end{array} \right. \), we need to evaluate \( f(3) \).
Since \( 3 \ge 0 \), we will use the second part of the function, which is \( f(x) = x + 2 \).
So, we plug in \( x = 3 \) into the function and get:
\( f(3) = 3 + 2 = 5 \)
Therefore, the answer is \( f(3) = 5 \) with no spaces.
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Are these triangles CBA-FGH similar
The two triangles cannot be similar, because they have one pair of corresponding angles that are not equal.
What is triangle ?
A triangle is a geometric shape consisting of three straight sides and three angles. The sum of the angles in a triangle is always 180 degrees. The point where two sides of a triangle meet is called a vertex. The side opposite to a vertex is called the opposite side, and the angle opposite to a side is called the opposite angle.
To determine if two triangles are similar, we need to check if their corresponding angles are equal and their corresponding sides are proportional.
Let's start with the angles:
In triangle CBA, we can use the Law of Cosines to find the measure of angle C:
[tex]cos(C) = (a^2 + b^2 - c^2) / (2ab)[/tex]
where a, b, and c are the side lengths opposite to angles A, B, and C, respectively.
[tex]cos(C) = (72^2 + 48^2 - 84^2) / (2 x 72 x 48)[/tex]
cos(C) = -0.25
Since cos(C) is negative, we know that angle C is obtuse.
Now, let's consider triangle FGH. By the Law of Cosines, we can find the measure of angle H:
[tex]cos(H) = (f^2 + g^2 - h^2) / (2fg)[/tex]
[tex]cos(H) = (8^2 + 12^2 - 14^2) / (2 x 8 x 12)[/tex]
cos(H) = 0.25
Since cos(H) is positive, we know that angle H is acute.
Therefore, the two triangles cannot be similar, because they have one pair of corresponding angles that are not equal.
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-9x^2(-3x^5 +5x -5) what is the anwser
Kendra has $7. 35 in her purse. She needs at least $2. 87 more to buy a special bead. What is the total amount, x, she needs for the bead? Which inequalities can be used to represent the situation?
Kendra needs to have at least $7.35 in her purse and needs to accumulate at least $2.87 more to shop for the special bead.
To discover the total amount Kendra needs to shop for the special bead, we add the amount she already has in her purse to the amount she needs to shop for the bead:
x = $7.35 + $2.87
x = $10.22
Thus, Kendra needs a total of $10.22 to shop for the special bead.
To represent the scenario as inequalities, we can use the subsequent:
Let y be the amount Kendra wishes to buy the unique bead, then:
Kendra has at least $7.35: y + $7.35 ≥ y
Kendra needs at the least $2.87 more: y + $2.87 ≤ x
Combining these inequalities, we get:
y + $7.35 ≥ y
y + $2.87 ≤ x
Therefore, Kendra needs to have at least $7.35 in her purse and needs to accumulate at least $2.87 more to shop for the special bead.
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inverse function for f(x)=2/5 (x-5)^2 it would become; x= 2/5
(y-5)^2 : need to solve for y
The final answer of inverse function for f(x)=2/5 (x-5)^2 is y = √(5/2 * x) + 5
The inverse function for f(x)=2/5 (x-5)^2 would become x= 2/5 (y-5)^2, and
We need to solve for y. Here is a step-by-step explanation of how to solve for y:
Now, multiply both sides of the equation by 5/2 to get rid of the fraction on the right side of the equation:
5/2 * x = (y-5)^2
Then, Take the square root of both sides of the equation to get rid of the exponent on the right side of the equation:
√(5/2 * x) = y-5
Add 5 to both sides of the equation to isolate y on one side of the equation:
√(5/2 * x) + 5 = y
Simplify the equation to get the final answer:
y = √(5/2 * x) + 5
Therefore, the inverse function for f(x)=2/5 (x-5)^2 is y = √(5/2 * x) + 5.
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A storage unit is in the shape of a right rectangular prism with a length of 10 feet, a width of 9.5 feet, and a height of 5 feet. The unit is completely filled with matter that weigh, on average, 0.45 pound per cubic foot. What is the weight, in pounds, of the contents in the container?
A: 1055.56 Ibs
B: 213.75 Ibs
C: 1632 Ibs
D: 102 Ibs
Answer:
Option A.) 1055.66 lbs
Step-by-step explanation:
Heather runs 3 miles in 28 minutes. At the same rate, how many miles would she run in 42 minutes?
Heather runs 3 miles in 28 minutes, so at the same rate, she would run 4.494 miles in 42 minutes.
To find out how many miles Heather would run in 42 minutes at the same rate, we use the concept of unit rate. Unit rate is a comparison of two different quantities when they are combined together. In this case, we need to find the unit rate of Heather's running speed in miles per minute.
Step 1: Find the unit rate of Heather's running speed in miles per minute.
To do this, we divide the distance she ran by the time she took to run it:
3 miles ÷ 28 minutes = 0.107 miles per minute
Step 2: Use the unit rate to find out how many miles Heather would run in 42 minutes.
To do this, we multiply the unit rate by the time she runs:
0.107 miles per minute × 42 minutes = 4.494 miles
Therefore, Heather would run 4.494 miles in 42 minutes at the same rate.
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.
The rectangle shown represents the base of a rectangular prism. Use the ruler provided to measure the length and width of the rectangle to the nearest 14
inch.
The height of the prism is 218
inches. Which measurement is closest to the volume of the prism in cubic inches?
F.33 inches3
G.23 inches3
H.11 inches 3
J.12 inches 3
The cubic inch value that most closely approximates the prism's volume is 12in³.
Define volume of a prism?Any three-dimensional solid's volume is the area it takes up. The shapes of these solids include cubes, cuboids, cones, cylinders, and spheres.
Forms come in a wide range of volumes. We have looked at a variety of three-dimensional solids and shapes, including cubes, cuboids, cylinders, cones, and more. We'll learn how to calculate the volumes of each of these forms.
To find the volume of the rectangular prism in the above problem, multiply its length, width, and height. The image reveals the rectangle's measurements to be around 5.5 inches long and 4 inches broad. Volume is calculated as follows: Volume = Length x Width x Height
= 5.5 inches x 4 inches x 218 inches
= 4 x 5.5 x 218
= 4 x 1199
= 4796
4796 cubic inches is the result.
When we round this response to the nearest whole number 12 in³ is the measurement that most closely approximates the prism's volume in cubic inches.
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The complete question is:
The rectangle shown represents the base of a rectangular prism. Use the ruler provided to measure the length and width of the rectangle to the nearest 14 inch. The height of the prism is 218inches. The dimensions are 5.5 inches and 4 inches. Which measurement is closest to the volume of the prism in cubic inches?
F.33 inches3
G.23 inches3
H.11 inches 3
J.12 inches 3