Solution

prove

Solution

Solution steps
Manipulating left side
Rewrite using trig identities
Use the Angle Difference identity:
Simplify
Rewrite using trig identities:
Write as
Use the Angle Sum identity:
Use the following trivial identity:
periodicity table with cycle:
Use the following trivial identity:
periodicity table with cycle:
Use the following trivial identity:
periodicity table with cycle:
Use the following trivial identity:
periodicity table with cycle:
Simplify
Apply rule
Rewrite using trig identities:
Write as
Use the Angle Sum identity:
Use the following trivial identity:
periodicity table with cycle:
Use the following trivial identity:
periodicity table with cycle:
Use the following trivial identity:
periodicity table with cycle:
Use the following trivial identity:
periodicity table with cycle:
Simplify
Multiply:
Rewrite using trig identities
Use the Angle Sum identity:
Simplify
Simplify
Use the following trivial identity:
periodicity table with cycle:
Multiply:
Simplify
Use the following trivial identity:
periodicity table with cycle:
Apply rule
Apply the fraction rule:
Use the basic trigonometric identity:
We showed that the two sides could take the same form

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Frequently Asked Questions (FAQ)

  • Is ((cos(pi+x))}{cos(\frac{3pi)/2-x)}=cot(x) ?

    The answer to whether ((cos(pi+x))}{cos(\frac{3pi)/2-x)}=cot(x) is True