Use the frequency distribution to the right, which shows the number of voters (in millions) according to age to find the probability that a voter chosen at random is in the given age range not between 35 and 44 years old.
Ages of voters Frequency 18 to 20 5.9 21 to 24 106 25 to 34 23 2 35 10 44 246 45 to 64 512 65 and over 275 The probability is___ (Round to three decimal places as needed.)

Using the formula of z-score, the highest and lowest acceptable scores are 132 and 108 respectively.

To find the highest and lowest acceptable scores for membership in the upper 25% range, we need to determine the z-scores corresponding to the cutoff points.

Since the variable is normally distributed, we know that the middle 50% of the distribution lies within ±0.6745 standard deviations from the mean. Therefore, the upper 25% range corresponds to the area beyond ±0.6745 standard deviations from the mean.

[tex]z = \frac{x - \mu}{\sigma}[/tex]

where;

In this problem, we are given that μ = 115 and σ = 12. We want to find the scores that correspond to the 75th percentile, which is 25% from the top. The 75th percentile is equivalent to a z-score of 0.6745.

Plugging these values into the z-score formula, we get:

z = (x - μ) / σ

0.6745 = (x - 115) / 12

x = 132

The highest acceptable score is 132.

The lowest acceptable score is the same as the mean, minus the z-score multiplied by the standard deviation. This gives us:

x = μ - zσ

x = 115 - 0.6745 * 12

x = 108

Learn more on z-score here;

https://brainly.com/question/25638875

#SPJ1

1. grad(T) . u = |grad(T)| cos(theta), 2. To maximize the rate of increase, we should move in the direction of the gradient vector, 3. The maximum rate of increase is |grad(T)|.

To answer your first question, we need to use the gradient vector which gives us the direction of the steepest increase of temperature. Let's call the point in question (x,y,z). Then, the gradient vector at that point is given by:
grad(T) = (dT/dx, dT/dy, dT/dz)
We are interested in the rate of change of temperature in the direction toward a specific point, which we will call (a,b,c). To find this rate of change, we need to compute the dot product between the gradient vector and the unit vector pointing from (x,y,z) toward (a,b,c). Let's call this unit vector u. Then, the rate of change of temperature in the direction toward (a,b,c) is given by:
grad(T) . u = |grad(T)| |u| cos(theta)
where |grad(T)| is the magnitude of the gradient vector, |u| is the magnitude of the unit vector, and theta is the angle between the two vectors. Since u is a unit vector, |u| = 1. Therefore, we can simplify the formula to:
grad(T) . u = |grad(T)| cos(theta)
To answer your second question, we need to find the direction in which the temperature increases fastest. This is simply the direction of the gradient vector. To see why, consider that the gradient vector points in the direction of the steepest increase in temperature. Therefore, to maximize the rate of increase, we should move in the direction of the gradient vector.
To answer your third question, we need to find the maximum rate of increase of temperature. This occurs in the direction of the gradient vector, and its magnitude is given by the magnitude of the gradient vector. Therefore, the maximum rate of increase is |grad(T)|.

Learn more about gradient vector here:

https://brainly.com/question/29699363

#SPJ11

By using the table of values, a graph of the number of tables along the x-axis and the number of guests along the y-axis is shown in the image below.

In Mathematics and Geometry, the point-slope form of a straight line can be calculated by using the following mathematical equation (formula):

y - y₁ = m(x - x₁)

Where:

Based on the sitting arrangement, we have:

x                 y_____

1 table    6 guests.

2 table    10 guests.

3 table    14 guests.

Next, we would determine the slope;

Slope (m) = (y₂ - y₁)/(x₂ - x₁)

Slope (m) = (10 - 6)/(2 - 1)

Slope (m) = 4/1

Slope (m) = 4

At data point (1, 6) and a slope of 4, a linear equation for this line can be calculated by using the point-slope form as follows:

y - y₁ = m(x - x₁)

y - 6 = 4(x - 1)

y = 4x - 4 + 6

y = 4x + 2

Read more on point-slope here: brainly.com/question/24907633

#SPJ9

Missing information:

The question is incomplete and the complete question is shown in the attached picture.

The required sample size (total) to reject the claim of men in the age group 20-30 averaging the same height in inches in the U.S. and the Netherlands, assuming both populations have a population standard deviation of 4, would be 1456.

To calculate the required sample size, we need to use the formula for sample size calculation in two-sample t-tests, which takes into account the desired level of significance, power, effect size, and population standard deviation. In this case, we want to be 99% confident (i.e., 1% level of significance) and have 90% power, which corresponds to a z-value of 2.33 and a t-value of 1.645. The effect size is 0.5/4 = 0.125, and plugging these values into the formula, we get a required sample size of 1456. This means that if we take a sample of 728 men from each population and find a difference of 0.5 inches or more between their means, we can reject the claim with 99% confidence and 90% power.

Learn more about population here

https://brainly.com/question/29885712

#SPJ11

The function that represents the situation is y = 125 sin(πt/20).

To construct the graph, we need to first find the equation of the circle that represents the Ferris wheel.

We know that the center of the circle is at the origin and one point on the circle is (125, 0).

Since the radius of the Ferris wheel is not given, we can assume it to be 100 feet (a common value for Ferris wheels).

Using the standard form of the equation of a circle, we get:

x² + y² = r²

Substituting the coordinates of the point (125, 0), we get:

125² + 0² = r²

Simplifying, we get:

r = 125

So the equation of the circle is:

x² + y² = 125²

To find the distance between the car and the horizontal axis at any given time, we need to find the y-coordinate of the point on the circle that corresponds to the angle swept out by the car in that time.

We know that the car takes 40 seconds to make a complete revolution around the Ferris wheel, so the angle swept out in t seconds is:

θ = 2πt/40

Using this angle, we can find the y-coordinate of the point on the circle as:

y = r sin(θ) = 125 sin(πt/20)

We can now plot a graph of y versus t from t=0 to t=40 seconds using a graphing calculator or spreadsheet software.

The resulting graph will show the relationship between the amount of time the car is in motion and the distance in feet between the car and the horizontal axis.

The graph will be a sinusoidal wave with a period of 40 seconds, an amplitude of 125 feet, and a vertical shift of 125 feet (since the lowest point of the Ferris wheel is at y=-125).

The graph will start at y=0 feet when t=0 seconds and will complete one cycle (from y=0 feet to y=0 feet) when t=40 seconds.

To learn more about the sine function;

https://brainly.com/question/12015707

#SPJ1

Step-by-step explanation:

f'(x)=-4x-16

f'(x)=0 <=> x=-4

evaluating the derivative of fx on the numberline we get the negative interval is (-4;+infinity)

The function f(x) = 2x² - 16x - 30 is negative between the roots x = -3 and x = 5. This is found using the quadratic formula to identify the roots and observing that the function dips below the x-axis between these two points.

To find the intervals where f(x) is negative, you would want to determine where the quadratic function is below the x-axis, which means finding the roots of the function first.

Given the quadratic function in standard form as: f(x) = 2x² - 16x - 30

To find the roots, you can use the quadratic formula: x = [-b ± sqrt(b² - 4ac)] / 2a

When you substitute a = 2, b = -16, and c = -30 into the formula, you get x = 5 and x = -3.

Therefore, the function f(x) is negative between these two roots (that is, -3 < x < 5).

https://brainly.com/question/35505962

A 90% confidence interval for the proportion of Americans with cancer was found to be (0.185, 0.210). is a. 0.1975.

The point estimate for a confidence interval is the midpoint of the interval. In this case, the midpoint would be the average of the lower and upper bounds: (0.185 + 0.210) / 2 = 0.1975.

Conclusion: Therefore, the point estimate for the given confidence interval of (0.185, 0.210) for the proportion of Americans with cancer is 0.1975.


To find the point estimate for a confidence interval, you can calculate the average of the lower and upper bounds. In this case, the lower bound is 0.185 and the upper bound is 0.210.

Step 1: Add the lower and upper bounds together: 0.185 + 0.210 = 0.395
Step 2: Divide the sum by 2 to find the average: 0.395 / 2 = 0.1975

Therefore, the point estimate for the 90% confidence interval for the proportion of Americans with cancer is 0.1975 (option a).

To know more about average visit:

https://brainly.com/question/27646993

#SPJ11

When the observed z-score is -2.15, we can find the p-value by looking up the value in a standard normal (z) table or using a calculator or software that provides p-values.

Step 1: Identify the z-score
The given z-score is -2.15.

Step 2: Find the p-value
To find the p-value, look up the z-score in a standard normal table or use a calculator. In this case, the p-value is approximately 0.0158.

So, the correct answer is:
c. 0.0158

This p-value represents the probability of observing a value as extreme or more extreme than the observed z-score in the standard normal distribution, assuming the null hypothesis is true.

To know more about observed visit:

https://brainly.com/question/31715625

#SPJ11

The inequality that describes all possible lengths of the base is x ≤ 34 So, the correct option is (A).

Let the length of each of the other two sides be y. Since the triangle is isosceles, we have y = y. We also know that the sum of the lengths of the other two sides is one unit less than the length of the base, so:

2y = x - 1

Solving for y, we get:

y = (x - 1)/2

The perimeter of the triangle is:

P = x + y + y = x + 2y

Substituting the expression for y we obtained earlier, we get:

P = x + 2[(x - 1)/2] = 2x - 2

We are given that P ≤ 67, so:

2x - 2 ≤ 67

Solving for x, we get:

x ≤ 34.5

Therefore, the inequality that describes all possible lengths of the base is:

x ≤ 34

So, the correct option is (A).

for such more question on inequality

https://brainly.com/question/17448505

#SPJ11

E) is a partially ordered set. a) E is a reflexive relation: A relation is reflexive if for every element X in P(A), XEX holds true. Since every set is a subset of itself (X ⊆ X), the relation E is reflexive.

b) E is not a symmetric relation:
A relation is symmetric if for every pair of elements X, Y in P(A), whenever XEY, it's also true that YEX. To disprove symmetry, consider two distinct sets X and Y where X is a proper subset of Y (X ⊆ Y and X ≠ Y). In this case, XEY, but YEX does not hold, so E is not symmetric.

c) E is an antisymmetric relation:
A relation is antisymmetric if for every pair of elements X, Y in P(A), if XEY and YEX, then X = Y. Since X ⊆ Y and Y ⊆ X implies X = Y, the relation E is antisymmetric.

d) E is a transitive relation:
A relation is transitive if for every three elements X, Y, Z in P(A), if XEY and YEZ, then XEZ. If X ⊆ Y and Y ⊆ Z, then X ⊆ Z, which means XEZ holds true. Therefore, E is a transitive relation.

e) E is not an equivalence relation:
An equivalence relation must be reflexive, symmetric, and transitive. While E is reflexive and transitive, it is not symmetric, so E is not an equivalence relation.

1) (P(A), E) is a partially ordered set:
A partially ordered set is a set with a binary relation that is reflexive, antisymmetric, and transitive. Since E has these properties, (P(A), E) is a partially ordered set.

Learn more about subset here:

brainly.com/question/31739353

#SPJ11

25$ will be the final cost.

The cost (y) depends on the number of items purchased (x). We know that there is a flat fee of $10, so we start with the equation

y = 10 + ...

Then we add the cost of each item, which is $5 per item:

y = 10 + 5x

This is the linear equation that represents the total cost as a function of the number of items purchased.

For example, if a customer purchases 3 items, the total cost would be:

y = 10 + 5(3) = 25

So the total cost would be $25.

Learn more about Linear equations here:

https://brainly.com/question/11897796

#SPJ1

Complete question:

A store charges a flat fee of $10 for every purchase, plus an additional $5 for every item purchased. Write a linear equation that represents the total cost (y) as a function of the number of items purchased (x).

The distance between two parallel planes is given by the absolute value of the difference between the constant terms in their equations divided by the square root of the sum of the squares of the coefficients of x, y, and z.

In this case, the constant term in the equation 2x − 5y + z = 4 is 4, and the constant term in the equation 4x − 10y − 2z = 2 is 2. Therefore, the absolute value of their difference is |4 - 2| = 2.  The coefficients of x, y, and z in the two equations are 2, -5, 1 and 4, -10, -2, respectively. The sum of the squares of these coefficients is 30 + 41 = 71. Therefore, the distance between the two planes is 2/√71.

Learn more about coefficients here: brainly.com/question/27548728

#SPJ11

The roots of the quadratic equations are listed below:

Case 13: x = 4 or x = 2

Case 14: x = - 2 or x = - 4

Case 15: x = 6 or x = - 9

Case 16: x = - 1 + i √3 or x = - 1 - i √3

Case 17: x = - 5 or x = - 6

Case 18: x = 10 or x = - 9

Case 19: x = - 1 or x = - 10

Case 20: x = 4 or x = 2

Case 21: x = 1 or x = - 2

Case 22: x = 2 or x = - 1

Case 23: x = 10 or x = 5

Case 24: x = 5 or x = 2

Case 25: x = 3 or x = - 6

Case 26: x = - 33 / 26 + i √471 / 26 or x = - 33 / 26 - i √471 / 26

In this problem we need to determine the roots of each of 14 quadratic equations, this can be done by means of quadratic formula, which is introduced below:

a · x² + b · x + c = 0

x = - b / (2 · a) ± [1 / (2 · a)] · √(b² - 4 · a · c), where a, b, c are real coefficients.

Now we proceed to determine the roots of each equation:

Case 13: (a = 1, b = - 6, c = 8)

x = 4 or x = 2

Case 14: (a = 1, b = 6, c = 8)

x = - 2 or x = - 4

Case 15: (a = 2, b = 6, c = - 108)

x = 6 or x = - 9

Case 16: (a = 5, b = 10, c = 20)

x = - 1 + i √3 or x = - 1 - i √3

Case 17: (a = 2, b = 22, c = 60)

x = - 5 or x = - 6

Case 18: (a = 1, b = - 1, c = - 90)

x = 10 or x = - 9

Case 19: (a = 1, b = 11, c = 10)

x = - 1 or x = - 10

Case 20: (a = 5, b = - 30, c = 40)

x = 4 or x = 2

Case 21: (a = 2, b = 2, c = - 4)

x = 1 or x = - 2

Case 22: (a = 4, b = - 4, c = - 8)

x = 2 or x = - 1

Case 23: (a = 1, b = - 15, c = 50)

x = 10 or x = 5

Case 24: (a = 1, b = - 7, c = 10)

x = 5 or x = 2

Case 25: (a = 1, b = 3, c = - 18)

x = 3 or x = - 6

Case 26: (a = 26, b = 66, c = 60)

x = - 33 / 26 + i √471 / 26 or x = - 33 / 26 - i √471 / 26

To learn more on quadratic equations: https://brainly.com/question/28695047

SPJ1

How many triangles exist with the given side lengths: C) More than one triangle exists with the given side lengths.

In Euclidean geometry, the Triangle Inequality Theorem states that the sum of any two side lengths of a triangle must be greater than or equal (≥) to the third side of the triangle.

Mathematically, the Triangle Inequality Theorem is represented by this mathematical expression:

b - c < n < b + c

Where:

n, b, and c represent the side lengths of this triangle.

4 + 4 > 7 (True).

4 + 7 > 4 (True).

Read more on Triangle Inequality Theorem here: brainly.com/question/26037134

#SPJ1

Complete Question:

How many triangles exist with the given side lengths?

4m, 4m, 7m

A) No triangle exists with the given side lengths.

B) Exactly one unique triangle exists with the given side lengths.

C) More than one triangle exists with the given side lengths.

The derivative of y = (x^2 + 3)(x^3 + 6) can be found in two ways. Both approaches yield the same derivative: dy/dx = 5x^4 + 9x^2 + 12x. One approach is to expand the expression and then differentiate it using the power rule and product rule. The second approach is to apply the product rule directly to the given expression.

Approach 1: Expand and differentiate

1. Expand the given expression: y = x^5 + 6x^3 + 3x^3 + 18

2. Simplify the expression: y = x^5 + 9x^3 + 18

3. Differentiate the expanded expression using the power rule: dy/dx = 5x^4 + 27x^2

Approach 2: Apply the product rule

1. Apply the product rule to the given expression: dy/dx = (x^2 + 3)(d/dx)(x^3 + 6) + (d/dx)(x^2 + 3)(x^3 + 6)

2. Differentiate each term separately using the power rule: dy/dx = (x^2 + 3)(3x^2) + (2x)(x^3 + 6)

3. Simplify the expression: dy/dx = 3x^4 + 9x^2 + 2x^4 + 12x

4. Combine like terms: dy/dx = 5x^4 + 9x^2 + 12x

Hence, both approaches yield the same derivative: dy/dx = 5x^4 + 9x^2 + 12x.

Learn more about product rule here:

brainly.com/question/29198114

#SPJ11

The value of angle x is 107°

A circle is a special kind of ellipse in which the eccentricity is zero and the two foci are coincident.

There is a theorem in circle geometry that states that : The angle subtended at the centre of a circle is twice the angle at the circumference.

This means if the angle at the circumference is 50, the angle at the center is 100.

The angle at the center = 360 - 146( angle at a point)

= 214°

2x = 214

x = 214/2

x = 107°

therefore the value of x is 107°

learn more about circle geometry from

https://brainly.com/question/24375372

#SPJ1

Okay, here are the steps to solve this problem:

* Kariro had y cows

* Ali had 3 times as much as Kariro, so Ali had 3y cows

* Nabwiso had half as much as Kariro, so Nabwiso had y/2 cows

* In total, they had:

** Kariro: y cows

** Ali: 3y cows

** Nabwiso: y/2 cows

* So in total: y + 3y + y/2 = 180

* 4.5y = 180

* y = 40

* So:

** Kariro had 40 cows

** Ali had 3 * 40 = 120 cows

** Nabwiso had 40/2 = 20 cows

Therefore, if the total cows was 180, then Nabwiso had 20 cows.

Let me know if you have any other questions!

1. The volume of the box is 287 cubic inches

2. The height of the box is 3 inches

From the question, we have the following parameters that can be used in our computation:

The figure

This figure can be broken down to

So, we have

Area = 1/2 * (3 + 7) * 2 * 2 + 7 * 3

Evaluate

Area = 41

The height is 7

So, we have

Volume = 41 * 7

Volume = 284

In (a), we have

Area = 41

So, we have

Height = Volume/Area

This gives

Height = 123/41

Evaluate

Height = 3

Hence, the height of the box is 3 inches

Read more about volume at

https://brainly.com/question/463363

#SPJ1

The sampling method described in the scenario is d. stratified sampling.

In stratified sampling, the population is divided into distinct subgroups or strata based on certain characteristics or variables. The researcher then randomly selects samples from each stratum in proportion to their representation in the population. This approach ensures that the sample is representative of the population's diversity.

In this case, the researcher has divided the population of teachers into two strata: male teachers and female teachers. By randomly selecting 50 male teachers and 50 female teachers, the researcher is ensuring that both genders are represented in the sample.

The researcher's intention is to have a sample that reflects the gender distribution of teachers in the population accurately. Therefore, stratified sampling is the appropriate method in this scenario.

Other sampling methods, such as systematic sampling, convenience sampling, random sampling, and cluster sampling, are not applicable because they do not specifically address the need to ensure proportional representation of genders in the sample.

Learn more about stratified sampling at: brainly.com/question/30397570

#SPJ11

The probability that a player will toss the die at least 2 times before blue lands faceup is 15/28.

The geometric distribution, which is a probability distribution that models the number of trials needed to achieve the first success in a sequence of Bernoulli trials, where each trial has a constant probability of success.

In this case, the Bernoulli trial is whether the die lands on blue, and the geometric distribution models the number of tosses needed to achieve the first blue face.

To find the probability that a player will toss the die at least 2 times before blue lands faceup, we need to find the probability of getting either a red or a yellow face on the first toss, and then either a blue face or another red/yellow face on the second toss.

The probability of getting a red or yellow face on the first toss is:

P(Red or Yellow) = 3/8 + 3/8 = 6/8 = 3/4

If the first toss is a red or yellow face,

then the probability of getting a blue face on the second toss is:

P(Blue on 2nd toss | Red or Yellow on 1st toss) = 2/7

So, the probability of getting blue on the second toss given the first toss is red or yellow is 2/7.

Therefore, the probability of not getting a blue face on the second toss given the first toss is red or yellow is 1-2/7=5/7.

Putting it all together, the probability of tossing the die at least 2 times before blue lands faceup is:

P(at least 2 tosses)

= P(Red or Yellow on 1st toss) × P(Not Blue on 2nd toss given Red or Yellow on 1st toss)

= (3/4) × (5/7)

= 15/28

Therefore,

The probability that a player will toss the die at least 2 times before blue lands faceup is 15/28.

Learn more about Geometric distribution at

https://brainly.com/question/14394276

#SPJ4

Answer:

For n = 1, 2, 3,.....,

[tex] a(n) = \frac{10n(n + 1)}{2} + 1 = 5n(n + 1) + 1 [/tex]

[tex] = 5 {n}^{2} + 5n + 1[/tex]

Answer:4.75

Step-by-step explanation: 209 divided by 44

The general solution of the differential equation near x = 0 is: y(x) = c1 x + c1^3/3 x^3 + (c1^4/4 + c1^6/9) x^4 + ... where c1 is an arbitrary constant.

To find the general solution of the given differential equation near x = 0, we can use the power series method. We assume that the solution can be written as a power series in x, that is:

y(x) = ∑n=0∞ cn xn

Then, we can find the coefficients cn by substituting the power series into the differential equation and equating the coefficients of like powers of x. Let's begin by computing the first and second derivatives of y(x):

y'(x) = ∑n=1∞ n cn xn-1

y''(x) = ∑n=2∞ n(n-1) cn xn-2

Now, we substitute these expressions into the differential equation and simplify:

y''(x) - xy'(x)^2 y(x) = 0

∑n=2∞ n(n-1) cn xn-2 - x(∑n=1∞ n cn xn-1)^2 (∑n=0∞ cn xn) = 0

Expanding the squares and collecting like terms, we get:

∑n=2∞ n(n-1) cn xn-2 - x∑n=1∞∑m=1∞ mcmn xn+m-2 - ∑n=0∞ cn xn+2 = 0

We can simplify the double sum by changing the index of summation:

∑n=2∞ n(n-1) cn xn-2 - x∑k=2∞∑n+m=k+2∞ mn cm cn-m xn+k-2 - ∑n=2∞ cn-2 xn = 0

We observe that the coefficient of x^0 on the left-hand side is zero, so we can assume that c0 = c1 = 0. Also, the coefficient of x^1 is zero, so we get:

2c2 - 2c2c1 = 0

c2 = c1^2

For higher values of n, we can recursively compute the coefficients in terms of c1. For example, the coefficient of x^2 is:

6c3 - 6c1c2 - c1^4 = 0

c3 = c1c2/6 + c1^4/6

Substituting c2 = c1^2, we get:

c3 = c1^3/3

Similarly, we can find the coefficient of x^3:

24c4 - 24c1c3 - 6c2c2 - 6c1^2c2 - c1^6 = 0

c4 = c1^4/4 + c1^2c2/12 + c1^6/24

Substituting c2 = c1^2 and c3 = c1^3/3, we get:

c4 = c1^4/4 + c1^6/9 + c1^6/24

In general, we can express the coefficients cn in terms of c1 as follows:

cn = ∑k=0^n-2 pk,c1^k

where pk,k = 1 and pk,m = ∑j=1^m-1 (j+1) pj-1,k for m > k+1.

Therefore, the general solution of the differential equation near x = 0 is:

y(x) = c1 x + c1^3/3 x^3 + (c1^4/4 + c1^6/9) x^4 + ...

where c1 is an arbitrary constant.

Learn more about derivatives at: brainly.com/question/30365299

#SPJ11

The answer will be 180 .

Given,

15% × 1200.

Firstly convert 15% to fraction form.

Percentage to fraction;

15% = 15/100

Now,

15/100 × 1200

15 × 12

180.

Thus the value of 15% of 1200 is 180.

Know more about Percentages,

https://brainly.com/question/14161154

#SPJ1

To find the center of mass of a cone of uniform density with radius R at the base, height h, and mass M, we need to use the formula:

x_cm = (1/M)∫∫∫xρdV
y_cm = (1/M)∫∫∫yρdV
z_cm = (1/M)∫∫∫zρdV

where x_cm, y_cm, and z_cm are the coordinates of the center of mass, ρ is the density, and V is the volume of the cone.

We can simplify the integral by using cylindrical coordinates, where the density is constant and equal to M/V, and the limits of integration are:

0 ≤ r ≤ R
0 ≤ θ ≤ 2π
0 ≤ z ≤ h(r/R)

Thus, the center of mass of the cone is:

x_cm = 0
y_cm = 0
z_cm = (3h/4)(r/R)^2

Therefore, the center of mass of the cone is located at (0, 0, (3h/4)(r/R)^2) with respect to the origin at the center of the base of the cone and +z going through the cone vertex.

Learn more about center of mass here:

https://brainly.com/question/30259066

#SPJ11

The horizontal distance between the base of the ladder and the wall is 8.6 feet.

distance is the length between two points.

To calculate the horizontal distance between the ladder and the wall, we use the formula below.

Formula:

[tex]\sf cos \ \theta=\dfrac{adjacent(y)}{hypotenuse(h)}[/tex]

Make y the subject of the equation

[tex]\sf h = \dfrac{y}{ cos\ \theta}[/tex]........ Equation 2

Where:

From the question,

Given:

Substitute these values into equation 2

[tex]\sf y = \dfrac{24}{(cos \ 69^\circ)}[/tex]

[tex]\sf y = \dfrac{24}{0.358}[/tex]

[tex]\sf y =\bold{8.6 \ feet}[/tex]

Hence, The horizontal distance between the base of the ladder and the wall is 8.6 feet.

Learn more about horizontal distance here: brainly.com/question/24784992

Step-by-step explanation:

Plug the values into the given distance formula

d = sqrt (( -5 - -1)^2 + ( 2-6)^2 )

d = sqrt (  16 + 16 )

d = sqrt 32 = 5.7

Answer:

129*

Step-by-step explanation:

First notice the 2 parallel lines. Since the 2 parallel lines are intersecting the same line, the angle measures would be the same for both. Since the first angle is 51*, the corresponding angle for the next line is also 51*. Since it intersects a straight line, the angles need to add up to 180*. 51 + x = 180 so x = 129*