Two polynomials x³⁶ - 3x³⁵ and x - 3.

Assertion (A) : If x - 3 is a factor of x³⁶ - 3x³⁵, the remainder is zero.

Reason (R) : The polynomial x - a is factor of polynomial p(x) = x³⁶ - ax³⁵, if p(a) = 0

options

1. A is true, R is false.

2. A is false, R is true.

3. Both A and R are true and R is correct reason for A.

4. Both A and R are true and R is incorrect reason for A.

Both A and R are true and R is correct reason for A.

Reason

By factor theorem,

(x - a) is a factor of the polynomial f(x), if the remainder i.e. f(a) = 0.

Let f(x) = x³⁶ - 3x³⁵

When, x - 3 is a factor of f(x), then f(3) = 0, by factor theorem.

∴ Assertion (A) is true.

When, p(x) = x³⁶ - ax³⁵ is divided by x - a, we get :

Remainder, p(a) = a³⁶ - a.a³⁵

= a³⁶ - a³⁶

= 0.

Since, p(a) = 0, thus (x - a) is factor of p(x).

∴ Reason (R) is true.

Thus, Both A and R are true and R is correct reason for R.

Hence, option 3 is the correct option.