Question

The remainder of a polynomial f(x) in x are 10 and 15 respectively when f(x) is divided by (x-3) and (x-4).Find the remainder when f(x) is divided by (x-3)(-4)?

The remainder of a polynomial f(x) in x are 10 and 15 respectively when f(x) is divided by (x-3) and (x-4).Find the remainder when f(x) is divided by (x-3)(x-4)?

Answer 1

`5x-5=5(x-1)`.

Explanation:

Recall that the degree of the remainder poly. is always

less than that of the divisor poly.

Therefore, when `f(x)` is divided by a quadratic poly.

`(x-4)(x-3)`, the remainder poly. must be linear, say, `(ax+b)`.

If `q(x)` is the quotient poly. in the above division, then, we

have, `f(x)=(x-4)(x-3)q(x)+(ax+b)............<1>`.

`f(x),` when divided by `(x-3)` leaves the remainder `10`,

`rArr f(3)=10....................[because," the Remainder Theorem]"`.

Then, by `<1>, 10=3a+b....................................<2>`.

Similarly,

`f(4)=15, and <1> rArr 4a+b=15....................<3>`.

Solving `<2> and <3>, a=5, b=-5`.

These give us, `5x-5=5(x-1)` as the desired remainder!