The degree of the polynomial `p(x)=x+sqrt(x^2)+1`

Degree of the polynomial p(x)=(x+2)(x-2) is

If n be the degree of the polynomial sqrt(3x^(2)+1){(x+sqrt(3x^(2)+1))^(7)-(x-sqrt(3x^(2)+1))^(7)} then n is divisible by

Find the degree of the polynomial (1)/(sqrt(4x+1)){((1+sqrt(4x+1))/(2))^(7)-((1+sqrt(4x+1))/(2))^(7)}

If a=7 , then find the degree of the polynomial p(x)=(x-a)^(3)+343 .

Find the degree of the polynomial ( x + 1 ) ( x^(2) - x + x^(4) - 1)

If n is the degree of the polynomial,[(2)/(sqrt(5x^(3)+1)-sqrt(5x^(3)-1))]^(8)+[(2)/(sqrt(5x^(3)+1)+sqrt(5x^(3)-1))]^(8) and m is the coefficient of x^(12) is

The degree of the polynomial (x+1)(x^(2)-x-x^(4)+1) is:

Assertion : The degree of the polynomial (x-2)(x-3)(x+4) is 4 . Reason : The number of zeroes of a polynomial is the degree of that polynomial .

Find the degree of the polynomial (x+2)(x^(2)-2x+4) .

Write zeros of the polynomial p(x)=4sqrt(3)x^(2)+5x-2sqrt(3)