if log (x+y)/3 = 1/2 (logx+logy) then find the value of xsq /ysq+ysq/xsq
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Hi,
log [ ( x + y )/3] = 1/2 ( logx + logy)
2× log[ ( x + y )/3 ] = log x + log y
log [ ( x + y ) / 3 ]^2 = log xy
{ since i ) n log a = log a^n
ii ) log a + log b = log ab }
Remove log bothsides,
[ ( x + y ) / 3 ]^2 = xy
( x + y )^2 / 3^2 = xy
x^2 + y^2 + 2xy = 9xy
x^2 + y^2 = 9xy - 2xy
x^2 + y^2 = 7xy
Divide each term with xy
x^2 / xy + y^2 / xy = 7xy / xy
x / y + y / x = 7
I hope this help you.
log [ ( x + y )/3] = 1/2 ( logx + logy)
2× log[ ( x + y )/3 ] = log x + log y
log [ ( x + y ) / 3 ]^2 = log xy
{ since i ) n log a = log a^n
ii ) log a + log b = log ab }
Remove log bothsides,
[ ( x + y ) / 3 ]^2 = xy
( x + y )^2 / 3^2 = xy
x^2 + y^2 + 2xy = 9xy
x^2 + y^2 = 9xy - 2xy
x^2 + y^2 = 7xy
Divide each term with xy
x^2 / xy + y^2 / xy = 7xy / xy
x / y + y / x = 7
I hope this help you.
zaidkhan620305:
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