If the energy, E=G^(p)h^(q)c^(r), where ...

If the energy, `E=G^(p)h^(q)c^(r)`, where G is the universal gravitational constant, h is the planck's constant and c is the velocity of light, then the value of p,q and r are respectively

A

`-1//2, 1//2 and 5//2`

B

`1//2 , -1//2 and -5//2`

C

`-1//2, 1//2 and 3//2`

D

`1//2, 1//2 and -3//2`

Text Solution

Verified by Experts

The correct Answer is:

A

`E = G^(p) h^(q) C^(r )`
Dimensionally
`[M^(1) L^(2) T^(-2)] = [M^(-1) L^(3) T^(-2)]^(p) [M^(1) L^(2)T^(-1)]^(q) [LT^(-1)]^(r )`
`[M^(1) L^(2) T^(-2)] = [M^(-p) L^(3p) T^(-2p)] [ M^(q)L^(2q)T^(-q)][L^(r ) T^(-r)]`
`[M^(1) L^(2)T^(-2)] = [M^(-p+q) L ^(3p +2q+r) T ^(-2p-q-r) ]`
`rArr -p+ q =1 " "rArr 3p +2q +r=2`
`rArr -2p -q -r =-2`
Solving we get , `p = - (1)/(2), q= (1)/(2) , r = (5)/(2)`

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