The -number of solutions of the equation `cos(pisqrt(x-4)cos(pi sqrtx)=1` is
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We have `cos(pi sqrt(x)) cos (pi sqrt(x-4))=1`, where `x ge 4` `rArr cos (pi sqrt(x))=1` and `cos (pisqrt(x-4))=1` `rArr pisqrt(x)=2m pi` and `(pi sqrt(x-4))=2n pi" "(m, n in Z)` `rArr x=4 m^(2) and x-4=4n^(2)` Now, `m^(2)-n^(2)=1` `rArr m=1, n=0` `:. x=4` So, `x=4` is the only solution of the equation.
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