1. I am the ratio of the number that is 10 less than 38 to the number

that is 10 more than 38. What ratio am I?

2. I am the ratio of 5 squared to 5 cubed. What ratio am I?

3. I am the ratio of the greatest common factor of 4 and 10 to the
least common multiple of 4 and 10. What ratio am I?

4. I am the ratio of the least factor of 48 to the greatest factor of 48.
What ratio am I?

5. I am the ratio of the sum of 2, 3, and 4 to the product of these
numbers. What ratio am I?

6. I am the ratio of the number of nickels in a dollar to the number
of quarters in a dollar. What ratio am I?

7. I am the ratio of the number of girls in your class to the number
of boys in your class. What ratio am I?

8. I am the ratio of the sum of two numbers whose product is 21 to
their difference. What ratio am I?

5 answers

So nothing is the answer?

Um anyone? I am struggling

Plz ASAP!

We do not do your homework for you. Although it might take more effort to do the work on your own, you will profit more from your effort. We will be happy to evaluate your work though.

1. To find the ratio, we need to calculate the two numbers mentioned in the problem. The number that is 10 less than 38 is 38 - 10 = 28. The number that is 10 more than 38 is 38 + 10 = 48. Therefore, the ratio is 28:48.

2. To find the ratio, we need to calculate the two numbers mentioned in the problem. 5 squared is 5 * 5 = 25. 5 cubed is 5 * 5 * 5 = 125. Therefore, the ratio is 25:125.

3. To find the ratio, we need to calculate the greatest common factor (GCF) and the least common multiple (LCM) of 4 and 10. The GCF of 4 and 10 is 2. The LCM of 4 and 10 is 20. Therefore, the ratio is 2:20.

4. To find the ratio, we need to determine the least factor and the greatest factor of 48. The least factor is 1, and the greatest factor is 48. Therefore, the ratio is 1:48.

5. To find the ratio, we need to calculate the sum of 2, 3, and 4 (2 + 3 + 4 = 9) and the product of these numbers (2 * 3 * 4 = 24). Therefore, the ratio is 9:24.

6. To find the ratio, we need to determine the number of nickels and the number of quarters in a dollar. There are 20 nickels in a dollar (since 1 dollar = 100 cents, and 1 nickel = 5 cents), and there are 4 quarters in a dollar (since 1 dollar = 100 cents, and 1 quarter = 25 cents). Therefore, the ratio is 20:4.

7. To find the ratio, we need to determine the number of girls and the number of boys in your class. Since the problem does not provide any specific numbers, we cannot determine the exact ratio. Instead, we can represent the ratio as "g:b", where "g" represents the number of girls and "b" represents the number of boys, and we cannot simplify further.

8. To find the ratio, we need to calculate the sum of two numbers whose product is 21 and their difference. Let's solve this algebraically.

Let's assume the two numbers are "x" and "y". We are given that xy = 21. We also know that the difference between the two numbers is x - y.

Now, if we solve the equation xy = 21 for y, we get y = 21/x. Substituting this into the difference equation, we get x - 21/x.

Therefore, the ratio is x:(x - 21/x). However, without specific values for x, we cannot simplify further.