If f(a + b + 1 − x) = f(x), for all x, where a and b are fixed positive real numbers, then 1/(a+b) ∫[a,b] x(f(x) + f(x + 1))dx is &lt;!-- [if !supportLineBreakNewLine]--&gt; &lt;!--[endif]--&gt;

∫[a+1, b+1] f(x)dx

∫[a-1, b-1] f(x)dx

∫[a-1, b-1] f(x + 1)dx

∫[a+1, b+1] f(x + 1)dx

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Definite Integrals Maths Integrals Maths Class 12th

If f(a + b + 1 − x) = f(x), for all x, where a and b are fixed positive real numbers, then 1/(a+b) ∫[a,b] x(f(x) + f(x + 1))dx is

Option 1 -

∫[a+1, b+1] f(x)dx

Option 2 -

∫[a-1, b-1] f(x)dx

Option 3 -

∫[a-1, b-1] f(x + 1)dx

Option 4 -

∫[a+1, b+1] f(x + 1)dx

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1 Answer

Answered by

alok kumar singh | Contributor-Level 10

a month ago

Correct Option - 1

Detailed Solution:

Answer given by NTS is (1) which is wrong.
I = 1/ (a+b) ∫? x [f (x) + f (x+1)]dx . (1)
Using the property x → a + b - x
I = 1/ (a+b) ∫? (a+b-x) [f (a+b-x) + f (a+b+1-x)]dx
Given f (a+b+1-x) = f (x)
I = 1/ (a+b) ∫? (a+b-x) [f (x+1) + f (x)]dx . (2)
Adding (1) and (2):
2I = 1/ (a+b) ∫? (a+b) [f (x) + f (x+1)]dx
2I = ∫? [f (x) + f (x+1)]dx
2I = ∫? f (x)dx + ∫? f (x+1)dx
Let x+1 = t in the second integral, so dx = dt.
When x=a, t=a+1. When x=b, t=b+1.
∫? f (x+1)dx = ∫? ¹ f (t)dt = ∫? ¹ f (x)dx

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If f(a + b + 1 − x) = f(x), for all x, where a and b are fixed positive real numbers, then 1/(a+b) ∫[a,b] x(f(x) + f(x + 1))dx is

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