Table of Contents

- 1 What is the remainder when 34 is divided by 5?
- 2 What is the remainder when we divide 390 +590 by 34?
- 3 How do you find the remainder of 3 numbers?
- 4 What is the remainder when we divide 390 + 590 by 34?
- 5 What is 390390 + 590 as a multiple of 9+25?
- 6 How do you find the remainder when you divide by 9?

## What is the remainder when 34 is divided by 5?

Using a calculator, if you typed in 34 divided by 5, you’d get 6.8. You could also express 34/5 as a mixed fraction: 6 4/5. If you look at the mixed fraction 6 4/5, you’ll see that the numerator is the same as the remainder (4), the denominator is our original divisor (5), and the whole number is our final answer (6).

### What is the remainder when we divide 390 +590 by 34?

when we divide (390+590)=980/34, we get 28 as remaider.

#### How do you find the remainder of 3 numbers?

Multiply the number you obtained in the previous step by the divisor. In our case, 49 * 7 = 343 . Subtract the number from the previous step from your dividend to get the remainder: 346 – 343 = 3 .

**What is the remainder of 34 divided by 3?**

Using a calculator, if you typed in 34 divided by 3, you’d get 11.3333. You could also express 34/3 as a mixed fraction: 11 1/3.

**What can u divide 34 by?**

When we list them out like this it’s easy to see that the numbers which 34 is divisible by are 1, 2, 17, and 34.

## What is the remainder when we divide 390 + 590 by 34?

What is the remainder when we divide 390 + 590 by 34? 390 + 590 can be written as (3 2) 45 + ( 5 2) 45 = (9) 45 + (25) 45 Any number of the form a n + b n is a multiple of (a + b) whenever n is odd So (9) 45 + (25) 45 is a multiple of 9 +25 = 34 So, the remainder when we divide (3 2) 45 + ( 5 2) 45 by 34 is equal to 0 3.

### What is 390390 + 590 as a multiple of 9+25?

390 + 590 can be written as (3 2) 45 + ( 5 2) 45 = (9) 45 + (25) 45 Any number of the form a n + b n is a multiple of (a + b) whenever n is odd So (9) 45 + (25) 45 is a multiple of 9 +25 = 34 So, the remainder when we divide (3 2) 45 + ( 5 2) 45 by 34 is equal to 0 3. N2 leaves a remainder of 1 when divided by 24.

#### How do you find the remainder when you divide by 9?

Similarly, if a number is being divided by 9, add each of the digits to each other until you are left with one number (e.g., 1164 becomes 12 which in turn becomes 3), which is the remainder. Lastly, you can multiply the decimal of the quotient by the divisor to get the remainder.

**What is the remainder when you Divide N2 by 24?**

So, the remainder when we divide (3 2) 45 + ( 5 2) 45 by 34 is equal to 0 3. N2 leaves a remainder of 1 when divided by 24. What are the possible remainders we can get if we divide N by 12?