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Question
Integrate the following with respect to x.
If f'(x) = x + b, f(1) = 5 and f(2) = 13, then find f(x)
Solution
f(x) = `int "f'"(x) "d"x`
f() = `int (x + "b") "d"x`
= `x^2/2 + "b"x + "c"`
f(1) = 5
⇒ `(1)^2/2 + "b"(1) + "c"` = 5
`1/2 + "b" + "c"` = 5
⇒ b + c = `5 - 1/2`
b + c = `9/2`
⇒ 2b + 2c = 9 .......(1)
f(2) = 13
⇒ `(2)^2/2 + "b"(2) + "c"` = 13
2 + 2b + c = 13
2b + c = 11 ........(2)
Solving equation (1) and (2)
2b + 2c = 9
2b + c = 11
(–) (–) (–)
c = – 2
Substitute c = – 2 in equation (2)
2b – 2 = 11
⇒ 2b = 11 + 2
b = `13/2`
f(x) = `x^2/2 + (13x)/2 - 2`
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