Given a right triangle ABC right angled at C and whose legs are given `1+4log_(p^2)(2p),1+2^(log_2(log_2(p))` and hypotenuse is given to be `1+log_2(4p)`. The area of `trianleABC` and circle circumscribing it are `Delta_1` and`Delta_2` respectively.

Given a right triangle ABC right angled at C and whose legs are given 1+4log_(p^(2))(2p), 1+2^(log_(2)(log_(2)p)) and hypotenuse is given to be 1+log_(2)(4p) . The area of DeltaABC and circle circumscribing it are Delta_(1) and Delta_(2) respectively, then Q. The value of sin ((pi(25p^(2)Delta_(1)+2))/(6))=

Given a right triangle ABC right angled at C and whose legs are given 1+4log_(p^(2))(2p), 1+2^(log_(2)(log_(2)p)) and hypotenuse is given to be 1+log_(2)(4p) . The are of DeltaABC and circle circumscribing it are Delta_(1) and Delta_(2) respectively, then Q. Delta_(1)+(4Delta_(2))/(pi) is equal to :

Given a right triangle ABC right angled at C and whose legs are given 1+4log_(p^(2))(2p),1+2^(log_(2)(log_(2)(p))) and hypotenuse is given to be 1+log_(2)(4p). The area of trian <=ABC and circle circumscribing it are Delta_(1) and Delta_(2) respectively.

Solve : log_8 (p^2 - p) - log_8 (p-1) = 2

If log_(2)p + log_(8)p + log_(32)p =(46)/(5) , then p =

The perimeter of an isosceles right angled triangle is 2p cm. Its area is -

If 1,log_(2)(3^(1-x)+2),log_(2)(4*3^(3)-1) are in A.P then x equals to

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If log_(2)(5.2^(x)+1),log_(4)(2^(1-x)+1) and 1 are in A.P,then x equals