Table of Contents

## What is the remainder when 9 Power 6 is divided by 8?

Solution(By Examveda Team) ⇒ on dividing (96 + 1) by 8, we get 2 as remainder.

### What is the remainder when 9/19 6 8?

The remainder when 9 19 + 6 is divided by 8 is 2 3 5 7 (919 + 6 ) / 8.

**What is the remainder when 7 343 divided by 9?**

1

Answer & Solution (8 times) × 7 = 343 × 343 × 343… (8 times) × 7. The remainder when 343 is divided by 9 is 1 and the remainder when 7 is divided by 9 is 7.

**What is the remainder when 7 38 is divided 48?**

Since, ${7^{38}}$ is of the form \[48\lambda + 1\] where \[\lambda \] is any integer. So, we get the remainder when ${7^{38}}$ is divided by $48$ as $1$. So, the correct answer is “1”.

## What will be the remainder when 9 6 1?

Thus, remainder is 2.

### What is the remainder of 599 divided by 9?

5

What is the remainder when 599 is divided by 9? The remainder is 5.

**What is the remainder when 738 is divided by 48?**

So, the correct answer is “1”.

**What is the remainder of 9^N+7 when divided by 8?**

We can conclude that 9^n + 7 is congruent 0 mod 8, and the remainder of 9^n+7 when divided by 8 is zero (0) for every natural number n. 9 6 + 7 = ( 8 + 1) 6 + 7 = ∑ k = 0 6 ( 6 k) 8 k 1 6 − k + 7. Separate the last term (edit: i meant the term for k = 0) on the sum, which is 1.

## What is the remainder of the remainder theorem?

Remainder Theorem Remainder Theorem is an approach of Euclidean division of polynomials. According to this theorem, if we divide a polynomial P (x) by a factor (x – a); that isn’t essentially an element of the polynomial; you will find a smaller polynomial along with a remainder.

### What is the remainder when 599 is divided by 9?

What is the remainder when 599 is divided by 9? The remainder is 5 . To calculate this, first divide 599 by 9 to get the largest multiple of 9 before 599. 5/9 < 1, so carry the 5 to the tens, 59/9 = 6 r 5, so carry the 5 to the digits. 59/9 = 6 r 5 again, so the largest multiple is 66.

**What is the difference between factor theorem and polynomial remainder?**

Here go through a long polynomial division, which results in some polynomial q (x) (the variable “q” stands for “the quotient polynomial”) and a polynomial remainder is r (x). It can be expressed as: Factor Theorem is generally applied to factoring and finding the roots of polynomial equations.