Table of Contents

- 1 What is the remainder if is divided by 77?
- 2 What is the remainder when 2 36 divided by 37?
- 3 What Cannot be a value of D if abc4d is divisible by 4?
- 4 What is the remainder when 75 is divided by 4?
- 5 What is the remainder when 25×25×4 is divided by 77?
- 6 How do you find the remainder when you divide by 9?

## What is the remainder if is divided by 77?

zero

Since it has a factor as 77, the remainder will be zero.

### What is the remainder when 2 36 divided by 37?

It turns out that 2 is a primitive root modulo 37 – that is, all the first 36 powers have a different remainder on division by 37. with the second half being the negated versions of the same, with 236≡1mod37.

#### What Cannot be a value of D if abc4d is divisible by 4?

Step-by-step explanation: Hence, in order to divide 4d by 4, the possible value of d can be 0,4 and 8. Because 40,44 and 48 are divisible by 4. Hence, the possible value of d will be 0,4 and 8.

**What is the remainder when 7 805 is divided by 24?**

so answer is 1.

**What is the remainder when 75 power 75 is divided by 37?**

Solution(By Examveda Team) When 75 is divided by 37, it leaves remainder of 1.

## What is the remainder when 75 is divided by 4?

The result of division of 75÷4 75 ÷ 4 is 18 with a remainder of 3 .

### What is the remainder when 25×25×4 is divided by 77?

So we will find the remiander when 3^36 is divided by 7 and by 11 separately, and by Chinese remainder theorem find the reminder when divided by 77. Least number n such that n mod 7 = 1 and n mod 11 = 3 is 36. The answer would be 36. The remainder when 77 is divided by 256 is 25. So remainder when 25×25×4 is divided by 77 is 36.

#### 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 of 4 divided by 32?**

Divide the first number of the dividend, 4 by the divisor, 32. 4 divided by 32 is 0, with a remainder of 4. You can ignore the remainder for now. Put the 0 on top of the division bracket.

**What is the remainder of 160 divided by 167 using long division?**

Draw a line and subtract 160 from 167. Since 7 is less than 32 your long division is done. You have your answer: The quotient is 15 and the remainder is 7. For longer dividends, you would continue repeating the division and multiplication steps until you bring down every digit from the divdend and solve the problem.