Solution
Solution
+1
Degrees
Solution steps
Solve by substitution
Let:
Find positive and negative intervals
Find intervals for
:
Move to the right side
Subtract from both sides
Simplify
Rewrite for
Apply absolute rule: If then
:
Move to the right side
Subtract from both sides
Simplify
Rewrite for
Apply absolute rule: If then
Identify the intervals:
Solve the inequality for each interval
For
For rewrite as
Expand
Apply Perfect Square Formula:
Simplify
Multiply fractions:
Cancel the common factor:
Multiply:
Apply exponent rule:
Apply rule
Expand
Distribute parentheses
Multiply fractions:
Multiply the numbers:
Cancel the common factor:
Combine the fractions
Convert element to fraction:
Since the denominators are equal, combine the fractions:
Multiply the numbers:
Add the numbers:
Expand
Remove parentheses:
Apply the distributive law:
Apply minus-plus rules
Multiply fractions:
Multiply the numbers:
Move to the left side
Add to both sides
Simplify
Move to the left side
Add to both sides
Simplify
Solve with the quadratic formula
Quadratic Equation Formula:
For
Multiply the numbers:
Subtract the numbers:
Apply rule
Separate the solutions
Add/Subtract the numbers:
Multiply the numbers:
Apply the fraction rule:
Apply rule
Subtract the numbers:
Multiply the numbers:
Apply the fraction rule:
Cancel the common factor:
The solutions to the quadratic equation are:
Combine the intervals
Merge Overlapping Intervals
The intersection of two intervals is the set of numbers which are in both intervals
and
For
For rewrite as
Expand
Apply Perfect Square Formula:
Simplify
Multiply fractions:
Cancel the common factor:
Multiply:
Apply exponent rule:
Apply rule
Expand
Distribute parentheses
Multiply fractions:
Multiply the numbers:
Cancel the common factor:
Combine the fractions
Convert element to fraction:
Since the denominators are equal, combine the fractions:
Multiply the numbers:
Add the numbers:
Expand
Apply the distributive law:
Multiply fractions:
Multiply the numbers:
Move to the left side
Subtract from both sides
Simplify
Move to the left side
Subtract from both sides
Simplify
Solve with the quadratic formula
Quadratic Equation Formula:
For
Apply exponent rule: if is even
Apply rule
Apply rule
Subtract the numbers:
Apply rule
Separate the solutions
Apply rule
Add the numbers:
Multiply the numbers:
Cancel the common factor:
Apply rule
Subtract the numbers:
Multiply the numbers:
Apply rule
The solutions to the quadratic equation are:
Combine the intervals
Merge Overlapping Intervals
The intersection of two intervals is the set of numbers which are in both intervals
and
Combine Solutions:
Substitute back
No Solution
General solutions for
periodicity table with cycle:
General solutions for
periodicity table with cycle:
Solve
General solutions for
periodicity table with cycle:
Combine all the solutions