Solution
prove
Solution
Solution steps
Manipulating left side
Simplify
Multiply
Multiply fractions:
Apply the fraction rule:
Multiply the numbers:
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:
Simplify
Multiply fractions:
Multiply the numbers:
Simplify
Apply radical rule:
Multiply the numbers:
Multiply fractions:
Multiply:
Multiply the numbers:
Apply rule
Manipulating right side
Simplify
Multiply
Multiply fractions:
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:
Simplify
Multiply fractions:
Multiply the numbers:
Simplify
Apply radical rule:
Multiply the numbers:
Multiply fractions:
Multiply:
Multiply the numbers:
Apply rule
We showed that the two sides could take the same form
Popular Examples
prove tan((5pi)/(12))=tan(pi/4+pi/6)prove prove sin^2(θ)=csc^2(θ)prove prove tan(x)(sec^2(x)-1)=tan^3(x)prove prove sin(x)=-1prove prove sec(b)+tan(b)=(cos(b))/(1-sin(x))prove
Frequently Asked Questions (FAQ)
Is (sin((5*pi/3)/4))=(sin(5 pi/(12))) ?
The answer to whether (sin((5*pi/3)/4))=(sin(5 pi/(12))) is True