Given that ∫π/4βf(x)dx=βsinβ+4πcosβ+2β Differentiating w. r. t β f(β)=βcosβ+sinβ−4πsinβ+2 f(2π)=(1−4π)sin2π+2=1−2π+2.
Let f(x) be a non-negative continuous function such that the area bounded by the curve y=f(x),x-axis and the ordinates x=4π and x=β>4π is (βsinβ+4πcosβ+2β). Then f(2π) is
Held on 30 Apr 2005 · Verified 6 Jul 2026.
(4π+2−1)
(4π−2+1)
(1−4π−2)
(1−4π+2)
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