Question

Question #ea647

Answer 1

`LHS=sinx(1+tanx)+cosx(1+cotx)`

`=sinx(1+tanx)+cosx(1+1/tanx)`

`=sinx(1+tanx)+cosx((1+tanx)/tanx)`

`=(1+tanx)(sinx+cosx/tanx)`

`=(1+tanx)(sinx+cosx/(sinx/cosx))`

`=(1+tanx)(sinx+cos^2x/sinx)`

`=(1+tanx)((sin^2x+cos^2x)/sinx)`

`=(1+tanx)/sinx`

`=1/sinx+cancel(sinx)/cosx*1/cancel(sinx)`

`=cscx+secx=RHS`

Proved

Answer 2

`LHS=sinx(1+tanx)+cosx(1+cotx)`

`=sinx+(sinx*sinx)/cosx+cosx+(cosx*cosx)/sinx`

`=sinx+sin^2x/cosx+cosx+cos^2x/sinx`

`=sinx+(1-cos^2x)/cosx+cosx+(1-sin^2x)/sinx`

`=sinx+1/cosx-cos^2x/cosx+cosx+1/sinx-sin^2x/sinx`

`=cancelsinx+secx-cancelcosx+cancelcosx+cscx-cancelsinx`

`secx+cscx=RHS`