Given f(3x+43x−4)=x+2,x=−34
Let, 3x+43x−4=t
3x−4=3tx+4t
x=3−3t4t+4+2
∴f(t)=3−3t10−2t
⇒f(x)=3x−32x−10
∫f(x)dx=∫3x−32x−10dx
=∫3x−32xdx−10∫3x−3dx
=32x−38ln∣x−1∣+C, where C is the constant of integration.
If f(3x+43x−4)=x+2,x=−34, and ∫f(x)dx=Alog∣1−x∣+Bx+C , then the ordered pair (A,B) is equal to
Held on 9 Apr 2017 · Verified 6 Jul 2026.
(−38,−32)
(−38,32)
(38,32)
(38,−32)
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