Find the coefficient of `a^(5)b^(7)` in `(a-2b)^(12)`.

If the coefficient of x^(7) in [ax^(2) + (1/bx)]^(11) equals the coefficient of x^(-7) in [ax - (1/(bx^(2)))]^(11) then a and b satisfy the relation

Find the coefficient of a^(2)b^(3)c^(4)d in the expansion of (a-b-c+d)^(10) .

Find the coefficient of x^(7) in the expansion of (ax^(2) + (1)/(bx))^(11) . (ii) the coefficient of x^(-7) in the expansion of (ax - (1)/(bx^2))^(11) . Also , find the relation between a and b , so that these coefficients are equal .

Find the coefficient of a^-6 b^4 in the expansion of (1/a-(2b)/3)^10 .

Find the product: (a+7)(b-5)

Find the product: (a^2+2b^2)(5a-3b)

Find the value of : 64a^3+125b^3 , if 4a+5b=-22,ab=-12 .

B= (5/2+x/2)^n , A= (1 + 3x)^m Sum of coefficients of expansion of B is 6561 . The difference of the coefficient of third to the second term in the expansion of A is equal to 117 . If n^(m) is divided by 7 , the remainder is

Find the using distributivity {(7)/(5)xx((-3)/(12))}+ {(7)/(5)xx(5)/(12)}