Solution
Solution
+1
Degrees
Solution steps
Rewrite using trig identities
Rewrite using trig identities
Use the basic trigonometric identity:
Use the Angle Difference identity:
Use the Angle Difference 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
Simplify
Use the following trivial identity:
periodicity table with cycle:
Apply rule
Simplify
Use the following trivial identity:
periodicity table with cycle:
Multiply:
Use the basic trigonometric identity:
Use the Angle Sum identity:
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
Simplify
Use the following trivial identity:
periodicity table with cycle:
Apply rule
Simplify
Use the following trivial identity:
periodicity table with cycle:
Multiply:
Apply the fraction rule:
Simplify
Remove parentheses:
Add similar elements:
Subtract from both sides
Simplify
Convert element to fraction:
Since the denominators are equal, combine the fractions:
Multiply:
Rewrite using trig identities
Divide both sides by
Simplify
Use the basic trigonometric identity:
Move to the right side
Add to both sides
Simplify
Divide both sides by
Divide both sides by
Simplify
General solutions for
periodicity table with cycle:
Popular Examples
(11.0994)/(cos(x))=(3.5355)/(sin(x))((sec(x))/(cos(x)))^2=tan^2(x)sin(x/2)-cos(x/2)=02sin^2(x/3)=1,-pi<= ,x<= picos^2(x)+sin^2(x)=sin(x)+1/2
Frequently Asked Questions (FAQ)
What is the general solution for tan(pi/2-x)+2tan(pi/2+x)=1 ?
The general solution for tan(pi/2-x)+2tan(pi/2+x)=1 is x=(3pi)/4+pin