The average (A) of two number,M and N, is given by the formula A=m+n/2. Find the average of the two numbers 36 and 72.

Answers

Answer 1

Answer:

54 is the average of the two numbers 36 and 72.

What is Statistics?

Statistics is the discipline that concerns the collection, organization, analysis, interpretation, and presentation of data.

We need to find the average of the two numbers 36 and 72.

The average (A) of two number, M and N, is given by the formula A=m+n/2

Let m = 36

n=72

Now to find the average of two numbers we have to plug in these values in the formula

A=36+72/2

=108/2

=54

Hence, 54 is the average of the two numbers 36 and 72.

To learn more on Statistics click:

brainly.com/question/29093686

#SPJ2

Answer 2

Answer:

Answer: 54

Step-by-step explanation:

Average = Total/ total number

Average= 36 +72/2

= 108/2

= 54

Related Questions

F(x)=-x+4 and g(x)=-2x-3 solve for f(g(x)) x=2
Antonio and Candice had a race. Their distances past a particular landmark as the race progressed can be represented by linear functions and are shown in the table of values and graph below. Which statement is true regarding Antonio and Candice’s race?Antonio’s Distance Past the LandmarkTime (seconds)812162024Distance (meters)2941536577A graph titled Candice's Distance Past the Landmark has time (seconds) on the x-axis, and Distance (meters) on the y-axis. A line goes through points (5, 22), (10, 42), (15, 62) and (20, 82).
Which line has a slope of 1/2 and goes through the point (2,4)?
You want to make an investment in a continuously compounding account earning 5.8% interest. how many years will it take for your investment to double in value? round the natural log value to the nearest thousandth. round the answer to the nearest year. 27 years 8 years 34 years 12 years
1)In a sample of 100 households, the mean number of hours spent on social networking sites during the month of January was 50 hours. In a much larger study, the standard deviation was determined to be 6 hours. Assume the population standard deviation is the same. What is the 98% confidence interval for the mean hours devoted to social networking in January? 2)Two studies were completed in Florida. One study in northern Florida involved 2,000 patients; 64% of them experienced flu-like symptoms during the month of December. The other study, in southern Florida, involved 3,000 patients; 54% of them experienced flu-like symptoms during the same month. Which study has the smallest margin of error for a 95% confidence interval?

How would you write 2,405 using a power of ten

Answers

Answer:2405.0

Step-by-step explanation:

Answer:

2405^10=6.4736737e+33

Solve for x. 3(3x - 1) + 2(3 - x) = 0 = 0

Answers

If you would like to solve the equation 3 * (3 * x - 1) + 2 * (3 - x) = 0, you can calculate this using the following steps:

3 * (3 * x - 1) + 2 * (3 - x) = 0
3 * 3 * x - 3 * 1 + 2 * 3 - 2 * x = 0
9 * x - 3 + 6 - 2 * x = 0
7 * x + 3 = 0
7 * x = - 3 /7
x = - 3/7

The correct result would be - 3/7.

Marie spends 14 dollars on lottery tickets every week and spends $128 per month on food. On an annual basis, the money spent on lottery tickets is what % of the money spent to buy foid

Answers

The money spend on lottery tickets is 40%

Jarred wants to buy a go-cart for $1,200. His part-time job pays him $160 a week. He has already saved $400. Which inequality represents the minimum number of weeks (w) he needs to work, in order to have enough money to buy the go-cart?

Answers

Hello!

The answer is:

$MinimumNumberOfWeeks\geq5$

Why?

First, we need to find the money that Jarred needs including the money that he has already saved.

$MoneyNeeded=1200-400=800$

So, Jarred needs $800.

If he earns $160 a week, we can find the minimum weeks he has to work in order to earn $800 following the next steps:

$WeeksToWork=(MoneyNeeded)/(WeeklyEarn)=(800)/(160)=5$

So, if he has to work at least 5 weeks to earn the total amount of money, it can be expressed by the following inequality:

$MinimumNumberOfWeeks\geq5$

Have a nice day!

Final answer:

Jarred has to save $800 more to buy the go-cart, that is $1,200 minus the $400 he already saved. If he earns $160 per week, the inequality representing the minimal number of weeks he has to work is: 160w >= 800. If we solve this inequality for w, we find that w must be equal or greater than 5 weeks.

Explanation:

This question is about solving inequalities. The cost of the go-cart is $1,200 and Jarred has already saved $400. That leaves him with $800 he still needs to save.

His job pays him $160 a week. Therefore, we can identify the inequality as 160w + 400 ≥ 1,200.

To determine the minimum number of weeks Jarred needs to work, we solve for w

Steps to solve:

Subtract 400 from both sides of the equation to isolate the term with w: 160w ≥ 800.
Divide both sides by 160 to solve for w: w ≥ 5.
As you cannot work a fraction of a week, the minimum number of weeks he needs to work is 5.

Learn more about inequalities here:

brainly.com/question/32625151

#SPJ12

What is the simplified square root of 1/56?

Answers

$\sqrt { \frac { 1 }{ 56 } } \n \n =\frac { \sqrt { 1 } }{ \sqrt { 56 } } \n \n =\frac { 1 }{ \sqrt { 7\cdot 8 } } \n \n =\frac { 1 }{ \sqrt { 7\cdot 2\cdot 4 } }$

$\n \n =\frac { 1 }{ \sqrt { 14\cdot 4 } } \n \n =\frac { 1 }{ \sqrt { 14 } \sqrt { 4 } } \n \n =\frac { 1 }{ 2\cdot \sqrt { 14 } } \n \n =\frac { 1 }{ 2\cdot \sqrt { 14 } } \cdot \frac { \sqrt { 14 } }{ \sqrt { 14 } } \n \n =\frac { \sqrt { 14 } }{ 2\cdot 14 } \n \n =\frac { \sqrt { 14 } }{ 28 }$

Graph h(x)=8 I x+1 I -1.

Answers

Answer:

search it up its there

Step-by-step explanation:

Other Questions

Solve for y y/162 - 7/9

If f(x) = 2x + 3 and g(x) = (x - 3)/2, what is the value of f[g(-5)]?

The orbital period, P, of a planet and the planet’s distance from the sun, a, in astronomical units is related by the formula P = a Superscript three-halves. If Saturn’s orbital period is 29.5 years, what is its distance from the sun?

The scatter plot below shows the number of prom tickets sold over a period of 7 days. The line of best fit drawn on the plot shown is used to predict the number of tickets sold on a certain day. Use the two points shown on the line of best fit to calculate its slope to the nearest tenth.