Question

(cosx-cos3x)/(sinx+sin3x)=tanx. How do I prove this?

asked Jul 14, 2020 108k views

1 Answer

← Prev Question Next Question →

Related questions

asked Oct 24, 2024 210k views

Prove that (cosx+cos3x+cos5x)/(sinx+sin3x+sin5x) = cot3x

Sajas asked Oct 24, 2024

by Sajas

8.2k points

1 answer

1 vote

210k views

asked Apr 25, 2024 56.9k views

Verify the identity. cos3x-cos2x+cosx / sin3x-sin2x+sinx=cot2x

David DV asked Apr 25, 2024

by David DV

8.8k points

1 answer

0 votes

56.9k views

asked Apr 4, 2018 233k views

Sin3x-sinx/cos3x-cosx=-cot2x

Ilovefigs asked Apr 4, 2018

by Ilovefigs

8.2k points

1 answer

4 votes

233k views

Ask a Question

Jronny · Answer 1 · 2020-07-19T05:49:34+0000

Answer:

Apply the trigonometric identities:

$cos\alpha-cos\beta=-2sin(\alpha+\beta)/(2)*sin(\alpha-\beta)/(2)$

$sin\alpha+sin\beta=2sin(\alpha+\beta)/(2)*cos(\alpha-\beta)/(2)$

$sin(-\alpha)=-sin(\alpha)\\cos(-\alpha)=cos(\alpha)$

$(sin\alpha)/(cos\alpha)=tan\alpha$

Explanation:

By definition you have:

$cos\alpha-cos\beta=-2sin(\alpha+\beta)/(2)*sin(\alpha-\beta)/(2)$

$sin\alpha+sin\beta=2sin(\alpha+\beta)/(2)*cos(\alpha-\beta)/(2)$

$sin(-\alpha)=-sin(\alpha)\\cos(-\alpha)=cos(\alpha)$

$(sin\alpha)/(cos\alpha)=tan\alpha$

Keeping the above on mind, you can rewrite the expression as following:

=((-2sin(x+3x)/(2)*sin(x-3x)/(2)))/((2sin(x+3x)/(2)*cos(x-3x)/(2)))

Simplify:

=((-2sin(4x)/(2)*sin(-2x)/(2)))/((2sin(4x)/(2)*cos(-2x)/(2)))

(You can cancel out the like terms)

$=(-(-sin(2x)/(2)))/(cos(-2x)/(2))\\=(sinx)/(cosx)\\\\=tanx$

0 Comments

Please log in or register to add a comment.

Please log in or register to answer this question.

1 Answer

0 Comments

Please log in or register to add a comment.

Related questions

Other Questions