please solve these two questions
Attachments:
Answers
Answered by
1
X=√(p+2q)+√(p-2q)/√(p+2q)-√(p-2q)
={√(p+2q)+√(p-2q)}{√(p+2q)+√(p+2q)}/{√(p+2q)-√(p-2q)}{√(p+2q)+√(p+2q)}
={√(p+2q)+√(p-2q)}²/[{√(p+2q)}²-{√(p-2q)}²]
={p+2q+p-2q+2√(p+2q)√(p-2q)}/(p+2q-p+2q)={2p+2√(p²-4q²)}/4q
={p+√(p²-4q²)}/2q
∴, x²={p+√(p²-4q²)}²/4q²
=[p²+2p√(p²-4q²)+{√(p²-4q²)}²]/4q²
={p²+p²-4q²+2p√(p²-4q²)}/4q²
=2{p²-2q²+p√(p²-4q²)}/4q²
={p²-2q²+p√(p²-4q²)}/2q²
∴, qx²-px+q
=q[{p²-2q²+p√(p²-4q²)}/2q²]-p[{p+√(p²-4q²)}/2q]+q
={p²-2q²+p√(p²-4q²)}/2q-{p²+p√(p²-4q²)}/2q+q
={p²-2q²+p√(p²-4q²)-p²-p√(p²-4q²)+2q²}/2q=0
hence proved
I hope U like it
={√(p+2q)+√(p-2q)}{√(p+2q)+√(p+2q)}/{√(p+2q)-√(p-2q)}{√(p+2q)+√(p+2q)}
={√(p+2q)+√(p-2q)}²/[{√(p+2q)}²-{√(p-2q)}²]
={p+2q+p-2q+2√(p+2q)√(p-2q)}/(p+2q-p+2q)={2p+2√(p²-4q²)}/4q
={p+√(p²-4q²)}/2q
∴, x²={p+√(p²-4q²)}²/4q²
=[p²+2p√(p²-4q²)+{√(p²-4q²)}²]/4q²
={p²+p²-4q²+2p√(p²-4q²)}/4q²
=2{p²-2q²+p√(p²-4q²)}/4q²
={p²-2q²+p√(p²-4q²)}/2q²
∴, qx²-px+q
=q[{p²-2q²+p√(p²-4q²)}/2q²]-p[{p+√(p²-4q²)}/2q]+q
={p²-2q²+p√(p²-4q²)}/2q-{p²+p√(p²-4q²)}/2q+q
={p²-2q²+p√(p²-4q²)-p²-p√(p²-4q²)+2q²}/2q=0
hence proved
I hope U like it
VivekGupta4040:
thnk u
are u having any idea of 18th question
Similar questions