If (log)a x=b for permissible values of ...

If `(log)_a x=b` for permissible values of `aa n dx ,` then identify the statement(s) which can be correct. If `aa n db` are two irrational numbers, then `x` can be rational. If `a` is rational and `b` is irrational, then `x` can be rational. If `a` is irrational and `b` is rational, then `x` can be rational. If `aa n d b` are rational, then `x` can be rational.

If a and b are two irrational numbers, then x can be retional.

If a is rational and b is irrational, then x can be rational.

If a is irrational and b is rational, then x can be rational.

If a and b are rational, then x can be rational.

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The correct Answer is:

A, B, C, D

` log_(a) x = b or x = a^(b)`
(1) For `a=sqrt2^(sqrt2)!inQ and b = sqrt2 !in Q, x = (sqrt2^(sqrt2))^(sqrt2)` which is rational.
(2) For ` a = 2 in Q abd b = log_(2) 3 !in Q , x = 3` which is rational.
(3) For ` a = sqrt2 and b = 2 , x = 2`
(4) The option is aboviously correct.

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If (log)_a x=b for permissible values of a and x , then identify the statement(s) which can be correct. (a)If a and b are two irrational numbers, then x can be rational. (b)If a is rational and b is irrational, then x can be rational. (c)If a is irrational and b is rational, then x can be rational. (d)if aa n d b are rational, then x can be rational.

if (log)_a x=b for permissible values of a and x then identify the statements which can be correct. (a) If a and b are two irrational numbers then x can be rational (b) if a is rational and b is irrational, then x can be rational (c) if a is irrational and b is rational, then x can be rational (d) If a and b are two rational numbers then x can be rational .

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