Let P(x) be a polynomial, which when divided by (x - 3) and (x - 5) leaves remainders 10 and 6, respectively. If the polynomial is divided by (x - 3) (x - 5), then the remainder is
- 2x + 16
16
2x - 16
60
the coefficient of x8 in is equal to the coefficient of x- 8 in then a and b will satisfy the relation
ab + 1 = 0
ab = 1
a = 1 - b
a + b = - 1
If A and B are coefficients of xn in the expansions of (1 + x)2n and (1+ x)2n - 1 respectively, then A /B is equal to
4
2
9
6
will be equal to
214
214 - 15
214 + 15
214 - 1
B.
214 - 15
We know,