" c) "(1)/(128)" to the base "2

Which of the following options represents the value of logsqrt(128) to the base 0.625 ?

Let S = ( 8 ) /( 5) + ( 16)/( 65) +"...." + ( 128)/( 2^(18) + 1) , then :

Statement-1: The remainder when (128)^((128)^(128)) is divided by 7 is 3. because Statement-2: (128)^(128) when divided by 3 leaves the remainder 1 .

A coin is tossed 7 xx.The probability of getting odd number of heads is (A) (7)/(128) (B) (5)/(128)( C) (1)/(2)( D ) (3)/(4)

In the expansion of (5^(1/2)+7^(1/8))^(1024), the number of integral terms is 128 b.129c.130

In the expansion of (5^(1//2)+7^(1//8))^(1024), the number of integral terms is 128 b. 129 c. 130 d. 131

In the expansion of (5^(1//2)+7^(1//8))^(1024), the number of integral terms is 128 b. 129 c. 130 d. 131

If x = sqrt(7)+(1)/(sqrt(7)) , then the value of (128)^(x^(2)) is-

If x = sqrt(7)+(1)/(sqrt(7)) , then the value of (128)^(x^(2)) is-