If p, q epsilon N satisfy the equation x...

If `p, q epsilon N` satisfy the equation `x^(sqrtx=(sqrtx)^x)` then `p & q` are

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If p,q varepsilon N satisfy the equation x^(sqrt(x)=(sqrt(x))^(x)) then p&q are

If p,q in N" satisfy the equation "x^(sqrtx) = (sqrtx)^(x) , then

If p,q in N" satisfy the equation "x^(sqrtx) = (sqrtx)^(x) , then

If p,q in N" satisfy the equation "x^(sqrtx) = (sqrtx)^(x) , then

If p , q in N satisfy the equation x^sqrt(x)=(sqrt(x))^x, then p a n d q are (a)relatively prime (b) twin prime (c) coprime (d)if (log)_q p is defined, then (log)_p q is not and vice versa

If p , q in N satisfy the equation x^sqrt(x)=(sqrt(x))^x, then pa n dq are (a)relatively prime (b) twin prime (c) coprime (d)if (log)_q p is defined, then (log)_p q is not and vice versa

If p , q in N satisfy the equation x^sqrt(x)=(sqrt(x))^x, then pa n dq are (a)relatively prime (b) twin prime (c) coprime (d)if (log)_q p is defined, then (log)_p q is not and vice versa

The roots of the equation x^sqrtx=sqrt(x^x) are

y = x+sqrtx+1/sqrtx

f(x)=sqrtx-(1)/(sqrtx)

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