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283

Part of 2008 Today's Calculation Of Integral

Problems(1)

Today's calculation of Integral 283

Source: 1977 Tokyo Institute of Technology entrance exam

1/24/2008
f(x) f(x) is a continuous function with the piriodicity of 2π 2\pi and c c is a positive constant number. Find f(x) f(x) and c c such that \int_0^{2\pi} f(t \minus{} x)\sin tdt \equal{} cf(x) with f(0) \equal{} 1 for all real numbers x x.
calculusintegrationfunctiontrigonometrycalculus computations