The number of real roots of `3^(2x^(2)-7x+7)= 9` is

Solve 3^(2x^(2)-7x + 7) = 9

Solve 3^(2x^2-7x+7)=9.

The number of real root of the equal x^(3) -6x +9 = 0 is :

The number of real roots of (7+4sqrt(3))^(|x|- 8)+(7-4sqrt(3))^(|x|-8)=14 is

The number of real roots of the equation |x|^(2) -3|x| + 2 = 0 , is

The number of real roots of the equation 1+3^(x//2)=2^(x) , is

The number of real roots of the equation x^(2)+x+3+2 sin x=0, x in [-pi,pi] , is

The Number of real roots of equation 2^x + 2^(x-1)+2^(x-2) =7^x + 7^(x-1)+7^(x-2) is

Number of roots of (x^(2)+5x+7)(-x^(2)+3x-4) = 0

Assertion (A ) : the number of roots of x^4 +2x^3 -7x^2 -8x +12=0 Reason (R ) : Every algebraic equation of degree n has n roots and nomore .