Square root of 56 is between what two whole numbers

Answers

Answer 1

Answer:

Answer:

$\huge\boxed{7,8}$

Step-by-step explanation:

In order to find what two numbers $√(56)$ is between, we need to find two numbers that, when squared, get us close to 56.

Let's see. We know that $7^2 = 49$ . We also know that $8^2 = 64$

We know that 56 is in between 7 and 8's squares - 49 and 64. This means that $√(56)$ will be in between $7^2$ and $8^2$ .

Hope this helped!

Answer 2

Answer:

Based on the question, the square root of 56 is between 7 and 8.

What is square root?

To find the whole numbers between which the square root of 56 lies, calculate the square root of 56 and then determine the whole numbers that surround it.

The square root of 56 is approximately 7.483314773547883.

The whole numbers between which the square root of 56 lies are 7 and 8.

Therefore, the square root of 56 is between 7 and 8.

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Related Questions

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Vanessa is skiing along a circular ski trail that has a radius of 2.5 km. She starts at the 3-o'clock position and travels in the CCW direction. Vanessa stops skiing when she is 1.244 km to the right and 2.169 km above the center of the ski trail. Imagine an angle with its vertex at the center of the circular ski trail that subtends Vanessa's path.How many radians has the angle swept out since Vanessa started skiing?
In the figure at the right AB || XY, and m<1 = 120. Tell weather each statement is true or false with #8, 9, 10, 11, 12, 13, 14, 15, 16, and 17
Caleb bought groceries and paid \$1.60$1.60dollar sign, 1, point, 60 in sales tax. The sales tax rate is 2.5\%2.5%2, point, 5, percent.What was the price of Caleb's groceries, before tax?
What is the next term of the arithmetic sequence 24, 16, 8, 0,

Four times the quotient of 3 and 4

Answers

Answer:

Step-by-step explanation:

Answer:

Step-by-step explanation:

The quotient of 3 and 4 is 0.75.

3/4 = 0.75

0.75 x 4 = 3...

So the answer is 3.

Deanna and Lise are playing game at the arcade. Deanna started with $20 and the the game she is playing costs $0.25 each game. Lise started with $40, and her machine costs $0.75 per game. How many games will it be before they both have the same amount of money left? Make an expression the solves the problem.

Answers

Deanna 78 games 19.50

Lisa 26 games 19.50

Hope that helps..

Final answer:

To determine how many games it will take for Deanna and Lise to have the same amount of money left, set up an equation using their net losses per game and solve for 'g'. It will take 40 games for them to have the same amount of money left.

Explanation:

To determine how many games it will take for Deanna and Lise to have the same amount of money left, we need to set up an equation. Let's start by determining their net loss per game by subtracting the cost of each game from their initial amount of money. For Deanna, her net loss per game is $0.25. For Lise, her net loss per game is $0.75.

Let's represent the number of games they play with the variable 'g'. To find the number of games it will take for them to have the same amount of money left, we need to set up an equation. Deanna's remaining money after 'g' games can be represented as $20 - $0.25g. Lise's remaining money after 'g' games can be represented as $40 - $0.75g.

Setting the two expressions equal to each other, we can solve for 'g':

$20 - $0.25g = $40 - $0.75g

$20 = $40 - $0.5g

$0.5g = $20

g = $20 / $0.5 = 40

Therefore, it will take 40 games before Deanna and Lise have the same amount of money left.

For a certain manufacturer, only ⅘ of the items produced are not defective.If 2,000 items are manufactured in a month, how many are not defective?

Answers

To find the number of non-defective chips, we simply use this equation:
2,000 * 4/5
8000/5
Now you simply divide:
1600
1600 chips aren't defective

A soup can has a height of 4 inches and a radius of 2.5 inches. What's the area ofpaper needed to cover the lateral face of one soup can with a label?
OA) 62.8 in?
B) 15.7 in?
C) 78.5 in2
125.7 in2

Answers

Answer:

The lateral surface can be thought of as the crossectional area of the surface integral over dA such that
$lateral \: = 2\pi * r * h \n given \: that \: formula \: : \n </li><li>lateral = 2\pi * (2.5)(4) \n \n 2\pi * 10 \n 20 * \pi \n \n lateral=62.8$

Answer: 62.8

Step-by-step explanation: took the test, hope this helps (;

Read the statement shown below.If Amelia finishes her homework, then she will go to the park.

Which of these is logically equivalent to the given statement? (1 point)

1. If Amelia did not go to the park, then she did not finish her homework.
2. If Amelia did not finish her homework, then she will go to the park.
3. If Amelia goes to the park, then she did not finish her homework.
4. If Amelia finishes her homework, then she cannot go to the park.

Answers

Hello there.

In this problem, we can use our intuition of logic, but I will show a proof of the result in a truth table later. Then, let's get started!

Given:

→ Amelia finishes the homework (sentence H, can be True or False)

→ Amelia goes to the park (P, true or false)

Then, we have: If H, then P. Logically:

H ⇒ P

Then we can think: everytime she does the homework, she goes to the park. Therefore, if she did not go to the park, she will not have finished the homework (It is an equivalent sentence).

Alternative 1.

==========

Now, let's prove that (H ⇒P) is equivalent to (¬P ⇒ ¬H), via the truth table:

H P ¬H ¬P (H ⇒ P) (¬P ⇒ ¬H)

T T F F T T

T F F T F F

F T T F T T

F F T T T T

As we can see, the results are identical, therefore, the sentences are indeed equivalent.

I hope it hepls :)

Number 1 is the same thing but told differently.

If x = 3 (y + 2) minus 1 what is the value of w in terms of x and y? w = StartFraction x minus 3 y Over 3 EndFraction w = StartFraction x minus 3 y + 1 Over 3 EndFraction w = x minus 3 y + 1 w = StartFraction x + 1 Over 9 y EndFraction

Answers

To find the value of w in terms of x and y, we need to substitute the given values of x and y into the equation for w. First, we are given the equation $x = 3(y + 2) - 1$ .

Let's simplify this equation before substituting it into the equation for w. Expanding the equation, we have: $x = 3y + 6 - 1 x = 3y + 5$ Now we can substitute the value of x into the equation for w. w $= (x - 3y + 1) / 3$ Substituting the value of x from the earlier equation: w $= (3y + 5 - 3y + 1) / 3 w = (6y + 6) / 3$

At this point, we can further simplify the equation by dividing both the numerator and denominator by 3: w $= 2y + 2$ Therefore, the value of w in terms of x and y is w $= 2y + 2. I$ n summary: Starting with x $= 3(y + 2) - 1,$ we substituted the value of x into the equation for w and simplified to obtain w $= 2y + 2.$

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