" Q.18Prove that "a^(x)-b^(y)=0" where "...

" Q.18Prove that "a^(x)-b^(y)=0" where "x=sqrt(log_(a)b)&y=sqrt(log_(h)a),a>0,b>0&a,b!=1

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Prove that a^(x)-b^(y)=0 where x=sqrt(log_(a)(b)&y)=sqrt(log_(b)(a)),a>0,b>0&a,b!=1

prove that a^(x)-b^(y)=0 where x=sqrt(log_(a)b) and y=sqrt(log_(b)a),a>0,b>0 and a,b!=1

Prove that a^x-b^y=0 where x=sqrt((log)_a b), y=sqrt((log)_b a), a >0, b >0 , a , b!=1

Prove that a^x-b^y=0 w h e r e x=" "sqrt(("log")_a b) & y=sqrt((log)_b a ), a >0, b >0 & a , b!=1

The value of a^x-b^y is (where x=sqrt(log_ab) and y=sqrt(log_ba),agt0,bgt0 and a,bne1 )

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