" The roots of the equation "(a+sqrt(b))...

" The roots of the equation "(a+sqrt(b))^(x^(2)-15)+(a-sqrt(b))^(x^(2)-15)=2aquad " where "a^(2)-b=1" ,are "

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the roots of the equation (a+sqrt(b))^(x^(2)-15)+(a-sqrt(b))^(x^(2)-15)=2a where a^(2)-b=1 are

the roots of the equation (a+sqrt(b))^(x^2-15)+(a-sqrt(b))^(x^2-15)=2a where a^2-b=1 are

the roots of the equation (a+sqrt(b))^(x^2-15)+(a-sqrt(b))^(x^2-15)=2a where a^2-b=1 are

the roots of the equation (a+sqrt(b))^(x^2-15)+(a-sqrt(b))^(x^2-15)=2a where a^2-b=1 are

the roots of the equation (a+sqrt(b))^(x^2-15)+(a-sqrt(b))^(x^2-15)=2a where a^2-b=1 are

the roots of the equation (a+sqrt(b))^(x^2-15)+(a-sqrt(b))^(x^2-15)=2a where a^2-b=1 are

the roots of the equation (a+sqrt(b))^(x^2-15)+(a-sqrt(b))^(x^2-15)=2a where a^2-b=1 are

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The no of real solutions of the equation (15+sqrt(14))^(t)+(15-sqrt(14))^(t)=30 are where t=x^(2)-2|x|

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