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Question
If (x – 2) is a factor of the expression 2x3 + ax2 + bx – 14 and when the expression is divided by (x – 3), it leaves a remainder 52, find the values of a and b.
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Solution
f(x) = 2x3 + ax2 + bx – 14
∴ (x – 2) is factor of f(x)
f(2) = 0
2(2)3 + a(2)2 + b(2) – 0
16 + 4a + 2b – 14 = 0
⇒ 4a + 2b = –2
2a + b = –1 ...(i)
Also, (x – 3) it leaves remainder = 52
∴ f(3) = 52
2(3)3 + a(3)2 + b(3) – 14 = 52
⇒ 54 + 9a + 3b – 14 = 52
⇒ 9a + 3b = 52 – 40
9a + 3b = 12
3a + b = 4 ...(ii)
From (i) and (ii)
2a + b = –1
3a + b = 4
– – –
Subtracting –a = –5
∴ a = 5 put in (i)
∴ 2(5) + b = –1
⇒ b = –1 – 10
⇒ b = –11
a = 5, b = –11
⇒ `(-27a)/(8) + (27)/(4) - (3b)/(2)` = 0
⇒ –27a + 54 – 12b – 24 = 0 ...(Multiplying by 8)
⇒ –27a – 12b + 30 = 0
⇒ –27a – 12b = –30
⇒ 9a + 4b = 10 ...[Dividing by (–3)]
9a + 4b = 10 ....(i)
Again let x + 2 = 0 then x = –2
Substituting the value of x in f(x)
f(x) = ax3 + 3x2 + bx – 3
f(–2) = a(–2)3 + 3(–2)2 + b(–2) – 3
= –8a + 12 – 2b – 3
= –8a – 2b + 9
∵ Remainder = –3
∴ –8a – 2b + 9 = –3
⇒ –8a – 2b = –3 – 9
⇒ –8a – 2b = –12 ...(Dividing by 2)
⇒ 4a + b = 6
Multiplying (ii) by 4
16a + 4b = 24
9a + 4b = 10
Substracting – – –
7a = 14
7a = 14
⇒ a = `(14)/(7)` = 2.
Substituting the value of a in (i)
9(2) + 4b = 10
⇒ 18 + 4b = 10
⇒ 4b = 10 – 18
⇒ 4b = –8
∴ b = `(-8)/(4)` = –2
Hence a = 2, b = –2
∴ f(x) = ax3 + 3x2 + bx – 3
= 2x3 + 3x2 – 2x – 3
∵ 2x + 3 is a factor
∴ Dividing f(x) by x + 2
`2x + 3")"overline(2x^3 + 3x^3 – 2x – 3 )("x^2 – 1`
2x3 + 3x2
– –
–2x – 3
–2x – 3
+ +
x
∴ 2x3 + 3x2 – 2x – 3
= (2x + 3)(x2 – 1) = (2x + 3)[(x2) - (1)2]
= (2x + 3)(x + 1)(x –1).
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