If `sin^2A=x` , then `sinAsin2Asin3Asin4A` is a polynomial in x , the sum of whose cofficients is :

If sin^(2)A=x, then sin A sin2A sin3A sin4A is a polynomial in x, the sum of whose cofficients is :

If sin^(2)A=x, then sin A sin2A sin3A sin4A is a polynomial in x, the sum of whose cofficients is :

If for n obtained in above question sin^(n) A= x then sin A sin 2A sin 3A sin 4A is a polynomial in x of degree

sin2A+2sin4A+sin6A=4cos^2Asin4A

write the polynomial 4x^(4)-2x^(2)+7x in index form and then in cofficient form.

If A+B+C =pi , prove that sin 2A+sin 2B+sin 2C=4 sin Asin B sin C.

If A+B+C=pi , prove that sin 2A-sin 2B+sin 2C=4cos Asin B cos C.

Assertion(A): The sum and product of the zeroes of a quadratic polynomial are (-1)/4 and 1/4 respectively. Then the quadratic polynomial is 4x^(2)+x+1 Reason (R):The quadratic polynomial whose sum and product of zeroes are given is x^(2) -(Sum of zeroes) x+ product of zeroes.