On Monday, Mr. Roberts drove 42 miles. On Tuesday, he drove 5 miles more than half the distance he drove on Monday. Which expression shows how you could find the distance, in miles, Mr. Roberts drove on Tuesday? A.(42-5)*2 B. 42-(5*2) C. (42/2)-5 D.(42/2)+5

Answer:

Statistic

Step-by-step explanation:

-In statistics, a statistic is a characteristic or an attribute of a sample used to estimate or calculate the true values/characteristics of an entire population.

-The value 9.6 is only representative of the small sample size of 104 children.

-If the sample size is sufficient enough it can be used to calculate the population's mean, standard deviation and other Central Limit Theorem measures.

The number 9.46 is referred to as a statistic in this context. A statistic is a characteristic that can be computed from the data in a sample, like the average sleep time of 104 children in this case.

The average number of hours of sleep per night was 9.46 hours for a sample of 104 five to seven year-old children. In this context, the number 9.46 is referred to as a statistic.

A statistic is a characteristic that can be computed from the data in a sample. For example, in this case, the data was collected from a group (or sample) of 104 children, and the average hours of sleep they got per night was calculated. The resultant number, 9.46 hours, serves as an estimation of the parameter we are interested in: the average sleep time of all 5 to 7 year-olds.

The term is frequently used in

statistics

, a branch of math that refers to the collection, analysis, interpretation, presentation, and organization of data.

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Answer:

0.395 kilometre

Step-by-step explanation:

Given:

On Martin's first stroke, his golf ball traveled 4/5 of the distance to the hole.

On his second stroke, the ball traveled 79 meters and went into the hole.

Question asked:

How many kilometres from the hole was Martin when he started?

Solution:

Let distance from Martin starting point to the hole in meters = [tex]x[/tex]

On Martin's first stroke, ball traveled = [tex]\frac{4}{5} \ of \ total \ distance\ to\ the\ hole[/tex]

                                                             [tex]=\frac{4}{5} \times x=\frac{4x}{5}[/tex]

On his second stroke, the ball traveled and went to the hole = 79 meters

Total distance from starting point to the hole = Ball traveled from first stroke + Ball traveled from second stroke

[tex]x=\frac{4x}{5} +79\\ \\ Subtracting\ both\ sides\ by \ \frac{4x}{5}\\ \\ x- \frac{4x}{5}= \frac{4x}{5}- \frac{4x}{5}+79\\ \\ \frac{5x-4x}{5} =79\\ \\ By \ cross\ multiplication\\ \\ x=79\times5\\ \\ x=395\ meters[/tex]

Now, convert it into kilometre:

1000 meter = 1 km

1 meter = [tex]\frac{1}{1000}[/tex]

395 meters = [tex]\frac{1}{1000}\times395=0.395\ kilometre[/tex]

Thus, there are 0.395 kilometre distance from Martin starting point to the hole.

Answer:

4

Step-by-step explanation:

Because 3×4=12

Answer:

4

Step-by-step explanation:

Simply divide 12 dollars into 3 dollars and you should get 4 :D

Answer:

16

Step-by-step explanation:

(-3r ^-4) ^-4

(-3) ^-4  * (r^-4) ^-4

We know a^-b = 1/a^b   and c^d^f = c^(d*f)

1/(-3)^4 * (r)^((-4*-4)

1/81 * r^16

The value of m is 16

Answer:

Karina must score atleast 92 on the fifth test to get a average of atleast 84.

Step-by-step explanation:

We are given the following in the question:

84, 86, 90, 68

We want the average score to be atleast 84.

Let x be the score on fifth test.

Formula:

[tex]Mean = \displaystyle\frac{\text{Sum of all observations}}{\text{Total number of observation}}[/tex]

Thus, we can write the equation:

[tex]\dfrac{84+86+90+68+x}{5}\geq 84\\\\\Rightarrow 84+86+90+68+x \geq 420\\\Rightarrow 328+x \geq 420\\\Rightarrow x \geq 92[/tex]

Thus, Karina must score atleast 92 on the fifth test to get a average of atleast 84.

Answer:

[tex]\frac{32}{56}\ < \frac{35}{56}[/tex]

[tex]\frac{27}{72} \ < \frac{32}{72}[/tex]

[tex]\frac{20}{24}\ < \frac{21}{24}[/tex]

[tex]\frac{9}{30}\ >\frac{8}{30}[/tex]

Step-by-step explanation:

Given that,

First set of fraction is [tex]\frac{4}{7}\ and \ \frac{5}{8}[/tex].

Second set of fraction is [tex]\frac{3}{8}\ and \ \frac{4}{9}[/tex].

Third set of fraction is [tex]\frac{5}{6}\ and \ \frac{7}{8}[/tex].

Fourth set of fraction is [tex]\frac{3}{10}\ and \ \frac{4}{15}[/tex].

Now,

Considering the first set of fraction:

LCM of 7 and 8 is 56. Now, multiply by 8 to both numerator and denominator to [tex]\frac{4}{7}[/tex]. and multiply by 7 to both the numerator and denominator to [tex]\frac{5}{8}[/tex]. We get new set of fraction as [tex]\frac{32}{56}\ and\ \frac{35}{56}[/tex].

∴[tex]\frac{32}{56}\ < \frac{35}{56}[/tex]

Again considering the second set of fraction:

LCM of 8 and 9 is 72. Now, multiply by 9 to both the numerator and denominator to [tex]\frac{3}{8}[/tex]. and multiply by 8 to both the numerator and denominator to [tex]\frac{4}{9}[/tex]. We get new set of fraction as [tex]\frac{27}{72} \ and \ \frac{32}{72}[/tex].

∴[tex]\frac{27}{72} \ < \frac{32}{72}[/tex].

Again considering the third set of fraction:

LCM of 6 and 8 is 24. Now, multiply by 4 to both the numerator and denominator to [tex]\frac{5}{6}[/tex]. and multiply by 3 to both the numerator and denominator to [tex]\frac{7}{8}[/tex]. We get the new set of fraction as [tex]\frac{20}{24}\ and \ \frac{21}{24}[/tex].

∴[tex]\frac{20}{24}\ < \frac{21}{24}[/tex].

Again considering the fourth set of fraction:

LCM of 10 and 15 is 30.Now, multiply by 3 to both the numerator and denominator to [tex]\frac{3}{10}[/tex]. and multiply by 2 to both the numerator and denominator to [tex]\frac{4}{15}[/tex].We, get the new set of fraction as [tex]\frac{9}{30}\ and \ \frac{8}{30}[/tex].

∴ [tex]\frac{9}{30}\ >\frac{8}{30}[/tex]

Answer:

The length of line segment QP is 20 units ⇒ 4th answer

Step-by-step explanation:

If a secant and a tangent are drawn from a point outside the circle, then the product of the lengths of the secant and its external segment equals the square of the length of the tangent segment

Look to the attached figure

∵ PQ is a tangent to the circle

∵ PM is a secant intersects the circle at points N and M

- That means the product of the lengths of PM and PN is

   equal to the square of the length of PQ

∴ (PQ)² = (PN). (PM)

∵ The length of Q P is n units

∴ PQ = n

∵ The length of N P is 11.5 units

∴ NP 11.5

∵ The length of M N is 24 units

∴ MN = 24

- The length of the secant PM is the sum of the lengths of PN

   and MN

∵ PM = PN+ NM

∴ PM = 11.5 + 24 = 35.5

Substitute the values of PQ, PN, and PM in the formula above

∵ n² = 11.5 × 35.5

∴ n² = 408.25

- Take √  for both sides

∴ n = 20.205197

- Round it to the nearest unit

∴ n = 20

∵ n is the length of PQ

∴ The length of line segment QP is 20 units

Answer:

D. 20 units

Step-by-step explanation:

Answer:

The number of viewers Network A expects will watch their show is 1.4 million viewers.

Step-by-step explanation:

The expected value is calculated by multiplying the possible outcomes by the probability of their occurrence and adding the results

Therefore, we have the expected value given by the following expression;

Estimated network A viewers  where network B schedule top show = 1.1 million viewers

Estimated network A viewers where network B schedule a different show = 1.6 million viewers

Probability that Network B will air its top show = 0.4

Probability that Network B will air another show = 0.6

We therefore have;

Expected value, E of Network A viewers is therefore;

E = 1.1 × 0.4 + 1.6 × 0.6 =  0.44 + 0.96 = 1.4 million viewers.

Network A expects 1.4 million viewers will watch their show.

Answer:

23

Step-by-step explanation:

3 times 4 equals 12

then do

35 minus 12

Answer:

a=4

35-3a=

35-3(4)=

35- 12=23

Step-by-step explanation:

Answer:

b

Step-by-step explanation:

Answer:The answer is B

Step-by-step explanation:

Answer:

66,000

Step-by-step explanation:

Answer:

GH¢32,500

Step-by-step explanation:

Monthly salary of Mensah=GH¢10,000.00

Commission=15%

15/100×GH¢ 1,500,00.00=GH¢22,500

Total amount earned=

Monthly salary+ Commission

GH¢10,000+GH¢22,500=GH¢32,500

Answer:

GH¢32,500

Step-by-step explanation:

Monthly salary of Mensah=GH¢10,000.00

Commission=15%

15/100×GH¢ 1,500,00.00=GH¢22,500

Total amount earned=

Monthly salary+ Commission

GH¢10,000+GH¢22,500=GH¢32,500

Answer:

x = -3

Step-by-step explanation:

simplify

3(x - 4) = -21

3x - 12 = -21

3x = = -9

x = -3

Final answer:

The actual distance between Madison and Franklin is 42 miles.

Explanation:

To find the actual distance between Madison and Franklin, we can use the given scale of 1 in: 7 mi. Since Madison and Franklin are 6 inches apart on the map, we can multiply the scale by the number of inches to find the distance in miles.

Distance in miles = Scale x Number of inches apart = 7 mi/in x 6 in = 42 miles

Therefore, the actual distance between Madison and Franklin is 42 miles.

Answer:

The salesman sold 56 large appliances.

Step-by-step explanation:

$57,400 - $35,000 = $22,400

He made $22,400 off the appliances.

To find how many appliances, you can divide 22,400 by 400.

The equation should be ($57,400 - $35,000)/400 = x

Here x represents the amount of large appliances sold. If you run the equation, the answer you should get is 56.

The salesperson vended 56 large appliances this time. The equation used to break this problem is

35,000$ 400x = $ 57,400, with' x' representing the number of appliances vended.

To determine how numerous large appliances the salesman vended, we can set up an equation grounded on the given information. Let's denote the number of large appliances he vended as x. The total earnings from these deals would be$ 400 times x. His periodic payment is$ 35,000, so the total quantum he made in the time, including his payment and the earnings from deals, is$ 57,400. thus, the equation to represent this situation is

$ 35,000$ 400x = $ 57,400

To break for x, we abate$ 35,000 from both sides

$ 400x = $ 57,400-$ 35,000

$ 400x = $ 22,400

Now, we divide both sides by$ 400 to find the number of appliances

x = $ 22,400/$ 400

x = 56

The salesperson vended 56 large appliances.

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Answer:

Is not a possible solution

Because the number of hours can not be negative

Step-by-step explanation:

Let

x------> the number of hours in the dog walking job

y----->  the number of hours in the sales job

we know that

-----> inequality A

------> inequality B

Remember that

If a ordered pair is a solution of the system of inequalities

then

the ordered pair must satisfy both inequalities

we have

------> Is not a possible solution

Because the number of hours can not be negative

Final answer:

Yes, (-3, 50) is a possible solution

Explanation:

The given system of inequalities is:

x + y < 60

7x + 12y > 450

To check if the solution (-3, 50) is possible, we substitute the values of x and y into the inequalities and check if the inequalities are true.

For the first inequality: (-3) + 50 < 60

47 < 60. This inequality is true.

For the second inequality: 7(-3) + 12(50) > 450

-21 + 600 > 450

579 > 450. This inequality is also true.

Since both inequalities are true when x = -3 and y = 50, we can conclude that (-3, 50) is a possible solution.

Answer:

160/3 got it on the ed thing

The volume of the cone is 167.5 cubic centimeters

The given parameters are:

Radius, r = 4 cm

Height, h = 10 cm

The volume is calculated using:

[tex]V = \frac 13 * \pi r^2h[/tex]

So, we have:

[tex]V = \frac 13 * 3.14 * 4^2 *10[/tex]

Evaluate

[tex]V = 167.5[/tex]

Hence, the volume of the cone is 167.5 cubic centimeters

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Answer:

An expression for the area of the pathway is [tex]4x^2+42x[/tex]

Step-by-step explanation:

Length of garden = 9 feet

Breadth of garden = 12 feet

Area of garden = [tex]Length \times Breadth = 9 \times 12 =108 ft^2[/tex]

We are given that you want to buy a pathway around the garden that is x feet

Width of pathway = x feet

Outer length = 9+x+x=9+2x

Outer breadth = 12+x+x=12+2x

Area of path including garden =[tex]Length \times Breadth = (9+2x)(12+2x)[/tex]

Area of path = Area of path including garden - Area of garden

Area of path =[tex](9+2x)(12+2x)-108[/tex]

Area of path =[tex]108+18x+24x+4x^2-108[/tex]

Area of path =[tex]4x^2+42x[/tex]

Hence an expression for the area of the pathway is [tex]4x^2+42x[/tex]

Answer:

4

Step-by-step explanation:

Step-by-step explanation:

X interprets (0,0), (-5, 0) all you must do is divide 5 by 2 so 5÷2=2.5 that is your answer

Answer:

13664 square feet

Step-by-step explanation:

Width of the Building=56 feet

Let the length of the building=L

Area of the building = LW=56L

A=56L

Available Perimeter for Fencing= 544 feet

Since we are using the side of the building as one part,

Perimeter = 2L+56=544

2L=544-56=488

L=244 feet

The area of the largest region that can be enclosed using theses requirements is given as:

Area = 244 X 56 =13664 square feet

To find the area of the largest region that can be enclosed with 544 feet of fencing alongside a 56-foot wide building, one sets up an equation for the fencing and solves for the width of the enclosure. The widest possible enclosure has a width of 244 feet, leading to a maximum area of 13,664 square feet.

To find the area of the largest rectangular region that can be constructed using the side of a building and a given amount of fencing, one must use the perimeter formula for a rectangle. Let's designate the widths of the rectangle that are not attached to the building as x, and the length that is attached to the building as 56 feet. Since two of the widths and one length will be enclosed by the fence, the total fencing used will be 2x + 56 feet.

Given that there are 544 feet of fencing available, we can set up the following equation:

2x + 56 = 544

Solving for x gives the width of the two sides not attached to the building:

2x = 488

x = 244 feet

The largest enclosed area will then be obtained by multiplying the length (alongside the building) by the width (the calculated x):

Area = 56 feet × 244 feet = 13664 square feet.

This calculation provides the largest possible rectangular area that can be enclosed with the given fencing, using the building as one side of the enclosure.

Answer: it will take the faster computer 15 minutes to do the job on its own.

Step-by-step explanation:

Let t represent the number of minutes it will take the faster computer to do the job on its own. It means that the rate at which it does the job per minute is 1/t

If it takes the slower computer 30 minutes to do the job on its own. It means that the rate at which it does the job on its own per minute is 1/30

By working together, they would work simultaneously and their individual rates are additive. Working together it takes two computers 10 minutes to send out a company's email. It means that the rate at which both computers work together per minute is 1/10 Therefore,

1/t + 1/30 = 1/10

Cross multiplying by 30x, it becomes

3x = x + 30

3x - x = 30

2x = 30

x = 30/2

x = 15 minutes

Answer:

Purse A will contain 2400 (by magic) and Purse B will have 64 pennies

Step-by-step explanation:

how this happened is, by magic Purse A went up by 200 every day for 7 days a week. 7*200 would be 1400 so you add that to the money from today and get 2400. Purse B somehow got from 1 penny to 64 in 7 days. The rule on this is to multiply by 2 every day. 1,2,4,8,16,32 and 64. have fun with your magic :3

Answer:

Jess used 34 blocks

Step-by-step explanation:

the first stack =7

second stack =7+3=10

third stack =10+7=17

total: 7+10+17=34

Answer:

Increase by 8.75

Step-by-step explanation:

75+82+67+72=296

296/4= 74

74 = Original Mean

75+82+96+78=331

New mean 82.75

82.75-74=8.75

Answer:

The mean increased by 6.8

Step-by-step explanation:

Answer: 314cm

Step-by-step explanation:

The area of a circle = πr^2

where π = 3.14

r = radius

From the question, we've been given the radius as 10cm. So, we plug the radius into the formula.

Area= πr^2

= 3.14 × (10 × 10)

= 3.14 × 100

= 314 cm

Answer:

Step-by-step explanation:

Given a composite figure,

A circle of radius r = 10cm

We want to find the area of the circle?

Area of a circle is calculated using

A = πr²

Where π is given to be 3.14

π = 3.14

And r is the radius of the circle

Then, area of the composite figure is

A = πr²

A = 3.14 × 10²

A = 3.14 × 100

A = 314 cm²

The last option is correct

Answer:

The answer is kite.

Step-by-step explanation:

Well, just looking at the definition of a kite, we can see that it lines up with Mr. Tesoro's description and drawing of the quadrilateral. A kite has one right angle that meets up witht two equal lines. The opposite pair of lines, that are much longer, don't meet up to be a right angle. The definitions line up, so there's your match; the anser is kite.

Answer:

130, 131, 132, 133

Step-by-step explanation:

Let the first page numbe be x, the next x+1, x+2, x+3

The sum of the first two will be x+x+1=2x+1

The sum of the last two will be x+2+x+3=2x+5

Product will be (2x+1)(2x+5)

Since the product equals 69165

(2x+1)(2x+5)=69165

[tex]4x^{2}+10x+2x+5=69165\\4x^{2}+12x+5=69165\\4x^{2}+12x-69160=0\\x^{2}+3x17290\\(x-130)((x+130)=0\\x=130, -133[/tex]

Therefore, x=130

Next pages are 131, 132, 133

To find the distance between the ranger station and the fire, we can use trigonometry and the angle of depression.

To solve this problem, we can use trigonometry. Let's call the distance from the ranger station to the fire 'x'.

Using the angle of depression of 35°, we can set up the trigonometric equation:

tan(35°) = (height of the ranger station) / x

Plugging in the known values, we get:

tan(35°) = 100 / x

To find 'x', we can rearrange the equation:

x = 100 / tan(35°)

Using a calculator, we can find:

x ≈ 100 / 0.7002

x ≈ 142.811 feet

Therefore, the ranger station is approximately 142.811 feet away from the fire.

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Final Answer:

The ranger station is approximately 142.8 feet away from the fire horizontally.

Explanation:

To find how far the ranger station is from the fire, we can use trigonometry. The ranger is 100 feet above ground, and the angle of depression from the station to the fire is 35 degrees.

Here's how you solve the problem step by step:
1. Imagine a right triangle where the ranger station is at the top, the fire is at the right angle (on the ground), and the line of sight from the ranger makes the hypotenuse.

2. The angle of depression is measured from the horizontal down to the line of sight. However, because alternate interior angles formed by a transversal with two parallel lines are congruent, the angle of depression from the ranger's horizontal line of sight to the fire is equal to the angle of elevation from the ground up to the ranger's line of sight. Therefore, the angle at the bottom of the triangle (the fire's location) is also 35 degrees.

3. We are dealing with the opposite side (the height of the station, 100 feet) and the adjacent side (the distance from the base of the station to the fire, which we want to find). For such problems, we use the tangent function, which relates the opposite to the adjacent side in a right triangle:

  [tex]\(\tan(\theta) = \frac{\text{opposite}}{\text{adjacent}}\)[/tex]

4. Plug in the known values:

 [tex]\(\tan(35^\circ) = \frac{100 \text{ feet}}{\text{distance to fire}}\)[/tex]

5. We want to solve for the distance to the fire, so we rearrange the equation:

  [tex]\(\text{distance to fire} = \frac{100 \text{ feet}}{\tan(35^\circ)}\)[/tex]

6. To find the distance to the fire, calculate [tex]\(\frac{100 \text{ feet}}{\tan(35^\circ)}\)[/tex]. You need to ensure you're working in degrees if using a calculator.

Let's do the math using an approximation for [tex]\(\tan(35^\circ)\)[/tex] (which is roughly 0.7002):
 [tex]\(\text{distance to fire} = \frac{100 \text{ feet}}{0.7002}\\\\ \(\text{distance to fire} = 142.8 \text{ feet}\)[/tex]
Hence, the ranger station is approximately 142.8 feet away from the fire horizontally.