问题描述:
╮(╯▽╰)╭,
tanA/2=根号5,则(1-sinA-cosA)/(1-sinA+cosA)=?
还有一题~
sin6°cos24°sin78°cos48°的值为?
问题解答:
我来补答
sinA=2sin(A/2)cos(A/2);1-cosA=2sin ² (A/2);1+cosA=2 cos ² (A/2)
又:tan(A/2)=√5,故:sin(A/2)cos(A/2)≠0
故:(1-sinA-cosA)/(1-sinA+cosA)
=[2sin ² (A/2)- 2sin(A/2)cos(A/2)]/[ 2 cos ² (A/2) - 2sin(A/2)cos(A/2)][分子、分母同时除以cos ² (A/2)]
=[2 tan²(A/2)- 2 tan(A/2)]/[ 2 - 2 tan(A/2)]
=(10- 2 √5)/(2 - 2 √5)
=-√5
sin6°cos24°sin78°cos48°
= sin6°sin78°cos24°cos48°
= sin6°cos12°cos24°cos48°
=16 sin6°cos6°cos12°cos24°cos48°/(16cos6°)
=8sin12° cos12°cos24°cos48°/(16cos6°)
=4sin24°cos24°cos48°/(16cos6°)
=2sin48°cos48°/(16cos6°)
=sin96°/(16cos6°)
= cos6°/(16cos6°)
=1/16
