" Show that "sin^(2)x=p+(1)/(p)" is impo...

" Show that "sin^(2)x=p+(1)/(p)" is impossible if "x" is reat."

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Show that sin^(2)x=p+1/p is impossible if x is real.

Show that sin^(2)x=p+1/p is impossible if x is real.

Show that sin^(2)x=p+1/p is impossible if x is real.

Show that sin^(2)x=p+1/p is impossible if x is real.

If sec A = x+(1)/(4x) prove that: sec A + tan A = 2x or (1)/(2x) (b) If "tan" theta = (p)/(q) ,show that : (p sin theta - q costheta)/(p"sin"theta+qcostheta)=( p^(2) - q^(2))/(p^(2)+q^(2))

If sin (x + y) = p/sqrt(1 + p^(2)) " and " cos (x - y) = 1/sqrt(1 + q^(2)) "then show that " tan x " is a root of the equation " (p + q)z^(2) + 2(1 - pq) z- (p + q) = 0

If both (x-2) and (x - (1)/(2)) are fractors of p x ^(2) 5x +r, then show that p=r.

If both (x-2) and (x - (1)/(2)) are fractors of p x ^(2) 5x +r, then show that p=r.

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