# What number must be subtracted from each of the numbers 9/16 and 30 so that they are in continued proportion?

Table of Contents

- 1 What number must be subtracted from each of the numbers 9/16 and 30 so that they are in continued proportion?
- 2 What number should be subtracted from each of the number 31 26 and 22 so that the remainder may be in continued proportion?
- 3 What least number must be subtracted from each of the numbers 9/16 and 21 40 so that the remainders are in proportional?
- 4 What least number must be subtracted from each term of ratio 15 19 to make the ratio 3 4?
- 5 What is the third proportional of 12 and 18?
- 6 What number should be subtracted from both the terms of ratio 15 19?

## What number must be subtracted from each of the numbers 9/16 and 30 so that they are in continued proportion?

→ x = 2 (Ans.) Therefore, 2 is subtracted from each of the numbers 9,16, and 30, so that they are in continued proportion .

## What number should be subtracted from each of the number 31 26 and 22 so that the remainder may be in continued proportion?

R D Sharma – Mathematics 9 Then the numbers are (31-x), (26-x) amd (22-x). Hence, -8.5 should be subtracted from each number so that the remainder is proportional.

**When X is subtracted from each of 19/28 55 and 91 the number so obtained in the order are in the proportion What is the mean proportional between X 9 and X²?**

When x is subtracted from each of 19, 28, 55, 91, obtained numbers are in proportion. ∴ Required mean proportion is 28.

**What number must be subtracted from each of the numbers 12 18 28 so that the remainders may be in continued proportion?**

Answer: The required number is 3.

### What least number must be subtracted from each of the numbers 9/16 and 21 40 so that the remainders are in proportional?

Complete step-by-step answer: ′2 ′ is the least number to be subtracted so that the numbers will be proportional.

### What least number must be subtracted from each term of ratio 15 19 to make the ratio 3 4?

Answer: 3 is the least number to be subtracted from each term of ratio 15:19 to make ratio 3:4.

**What least number must be added to each of the numbers 6 15 20 and 43 so that the resulting numbers are proportional?**

Thus, the required number which should be added is 3.

**What number should be added to 2×3 3×2 8x 3 so that the resulting polynomial leaves the remainder 10 when divided by 2x 1?**

Answer: 7 must be added.

## What is the third proportional of 12 and 18?

3.

## What number should be subtracted from both the terms of ratio 15 19?

So 3 need to be subtracted.

**What must be subtracted from each of the numbers26 37 46 and 67 to get the numbers which are in proportion?**

1 will be subtracted from these to be proportion.

**What number must be subtracted from each of the numbers 14 17 34 and 42 to get numbers which are in proportion?**

what least number must be subtracted from each of the numbers 14,17,34 and 42, so that the remainders may be proportional,,,,and its answer is 2 solved them.