What must be subtracted from x^3+ 3x^2-18x-30 so that the result is exactly divisible by x^2+x-20
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Answer:
Let p (x) = x3 - 6x2 - 15x + 80 and q (x) = x2 + x - 12
By division algorithm, when p (x) is divided by q (x), the remainder is a linear expression in x.
So, let r (x) = ax + b is subtracted to p (x) so that p (x) + r (x) is divisible by q (x).
Let, f (x) = p (x) – r (x)
⇒ f(x) = x3 - 6x2 - 15x + 80 – (ax + b)
⇒ f(x) = x3 - 6x2 – (a + 15)x + (80 – b)
We have,
q(x) = x2 + x – 12
⇒ q(x) = (x + 4) (x - 3)
Clearly, q (x) is divisible by (x + 4) and (x - 3) i.e. (x + 4) and (x - 3) are factors of q (x)
Therefore, f (x) will be divisible by q (x), if (x + 4) and (x - 3) are factors of f (x).
i.e. f(-4) = 0 and f(3) = 0
f (3) = 0
⇒ (3)3 – 6(3)2 – 3 (a + 15) + 80 – b = 0
⇒ 27 – 54 – 3a – 45 + 80 – b = 0
⇒ 8 – 3a – b = 0 (i)
f (-4) = 0
⇒ (-4)3 – 6 (-4)2 – (-4) (a + 15) + 80 – b = 0
⇒ -64 – 96 + 4a + 60 + 80 – b = 0
⇒ 4a – b – 20 = 0 (ii)
Subtract (i) from (ii), we get
⇒ 4a – b – 20 – (8 – 3a – b) = 0
⇒ 4a – b – 20 – 8 + 3a + b = 0
⇒ 7a = 28
⇒ a = 4
Put value of a in (ii), we get
⇒ b = -4
Putting the value of a and b in r (x) = ax + b, we get
r (x) = 4x – 4
Hence, p (x) is divisible by q (x), if r (x) = 4x – 4 is subtracted from it.