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рдкреНрд░рд╢реНрди
Prove that ЁЭТХЁЭТВЁЭТПЁЭТЙ−ЁЭЯП(ЁЭТФЁЭТКЁЭТП ЁЭЬ╜) = ЁЭТДЁЭТРЁЭТФЁЭТЙ−ЁЭЯП(ЁЭТФЁЭТЖЁЭТД ЁЭЬ╜)
рдЙрддреНрддрд░
`L.H.S = tanh^1(sin θ)`
We know that, `tanh^-1(x)=1/2log ((1+x)/(1-x))`
∴ `L.H.S=1/2 log ((1+sin θ)/(1-sin θ) )`
`R.H.S=cosh^-1 (secθ)`
We know that , `cosh^-1 (x)=log (x+sqrt(x^2-1))`
∴ R.H.S =` log(sec θ +sqrt(sec^2θ-1))`
= `log (1/cos θ+sin θ/cos θ)` ...........`{sqrt(sec^2θ-1)=tanθ=sinθ/cosθ}`
=` log ((1+sin θ)/cos θ)`
=` log (1+sin θ/sqrt(1-sin^2θ))`
=` log (sqrt(1+sinθ)/sqrt(1-sin θ))`
= `1/2 log ((1+ sin θ)/(1-sin θ))`
∴ `tanh^-1(sin θ)=cosh^-1(sec θ)`
Hence Proved.
shaalaa.com
.Circular Functions of Complex Number
рдпрд╛ рдкреНрд░рд╢реНрдирд╛рдд рдХрд┐рдВрд╡рд╛ рдЙрддреНрддрд░рд╛рдд рдХрд╛рд╣реА рддреНрд░реБрдЯреА рдЖрд╣реЗ рдХрд╛?
