Solution
Solution
+1
Degrees
Solution steps
Rewrite using trig identities
Use the Pythagorean identity:
Solve by substitution
Let:
Rewrite the equation with and
Solve
Factor
Factor out common term
Apply exponent rule:
Factor out common term
Factor
Rewrite as
Rewrite as
Apply exponent rule:
Apply Difference of Two Squares Formula:
Factor
Rewrite as
Apply factoring rule: n is odd
Factor
Rewrite as
Apply factoring rule:
Using the Zero Factor Principle: If then or
Solve
Move to the right side
Subtract from both sides
Simplify
Solve No Solution for
Find one solution for using Newton-Raphson:No Solution for
Newton-Raphson Approximation Definition
Find
Apply the Sum/Difference Rule:
Apply the Power Rule:
Simplify
Apply the Power Rule:
Simplify
Apply the Power Rule:
Simplify
Apply the common derivative:
Derivative of a constant:
Simplify
Let Compute until
Cannot find solution
The solution is
Solve
Move to the right side
Add to both sides
Simplify
Solve No Solution for
Find one solution for using Newton-Raphson:No Solution for
Newton-Raphson Approximation Definition
Find
Apply the Sum/Difference Rule:
Apply the Power Rule:
Simplify
Apply the Power Rule:
Simplify
Apply the Power Rule:
Simplify
Apply the common derivative:
Derivative of a constant:
Simplify
Let Compute until
Cannot find solution
The solution is
The solutions are
Substitute back solve for
Solve
Apply rule
Solve No Solution for
cannot be negative for
Solve
For the solutions are
Apply rule
Apply rule
The solutions are
Substitute back
General solutions for
periodicity table with cycle:
Solve
General solutions for
periodicity table with cycle:
General solutions for
periodicity table with cycle:
Combine all the solutions
Popular Examples
cos(x/4)sin(x/4)=sqrt(3)sin(x/4)cos(x/4)5cos(x)=1+2sin^2(x)tan(2x+1)=-cot(x+3)(4sec^2(x))/2 =-8sec(x)tan(x)+tan^3(x)=0
Frequently Asked Questions (FAQ)
What is the general solution for 1-cos^2(x)-sin^{22}(x)=0 ?
The general solution for 1-cos^2(x)-sin^{22}(x)=0 is x=2pin,x=pi+2pin,x= pi/2+2pin,x=(3pi)/2+2pin