Home
Class 12
MATHS
Given a right triangle ABC right angled ...

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 :

A

31

B

28

C

`3+(1)/(sqrt(2))`

D

199

Text Solution

Verified by Experts

The correct Answer is:
A
Promotional Banner

Topper's Solved these Questions

  • LOGARITHMS

    VK JAISWAL ENGLISH|Exercise Exercise-5 : Subjective Type Problems|19 Videos

  • LOGARITHMS

    VK JAISWAL ENGLISH|Exercise Exercise-2 : One or More than One Answer is/are Correct|4 Videos

  • LIMIT

    VK JAISWAL ENGLISH|Exercise EXERCISE (SUBJECTIVE TYPE PROBLEMS)|7 Videos

  • MATRICES

    VK JAISWAL ENGLISH|Exercise Exercise-4 : Subjective Type Problems|5 Videos

Similar Questions

Explore conceptually related problems

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.

If Delta_1=|(1,0),(a,b)| and Delta_2=|(1,0),(c,d)| , then Delta_2Delta_1 is equal to :

Solve 1/4 x ^(log_(2)sqrtx)=(2*x^(log_(2)x))^(1/4).

Solve log_(8)(P^(2)-p)-log_(8)(p-1)=2

If the mid-points P, Q and R of the sides of the Delta ABC are (3, 3), (3, 4) and (2,4) respectively, then Delta ABC is

If log_(1//2)(4-x)gelog_(1//2)2-log_(1//2)(x-1) ,then x belongs to

The sum of all the roots of the equation log_(2)(x-1)+log_(2)(x+2)-log_(2)(3x-1)=log_(2)4

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

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

If p_(1),p_(2),p_(3) are altitudes of a triangle ABC from the vertices A,B,C and triangle the area of the triangle, then p_(1)^(-2)+p_(2)^(-2)+p_(3)^(-2) is equal to