Algebra
Calculus
Trigonometry
Matrix
Question
Solve the inequality
Solve the inequality by testing the values in the interval
Solve for x
x≤0
Alternative Form
x∈(−∞,0]
Evaluate
−x2×2x×8≥0
Multiply
More Steps
Evaluate
x2×2x×8
Multiply the terms with the same base by adding their exponents
x2+1×2×8
Add the numbers
x3×2×8
Multiply the terms
x3×16
Use the commutative property to reorder the terms
16x3
−16x3≥0
Rewrite the expression
−16x3=0
Change the signs on both sides of the equation
16x3=0
Rewrite the expression
x3=0
The only way a power can be 0 is when the base equals 0
x=0
Determine the test intervals using the critical values
x<0x>0
Choose a value form each interval
x1=−1x2=1
To determine if x<0 is the solution to the inequality,test if the chosen value x=−1 satisfies the initial inequality
More Steps
Evaluate
−16(−1)3≥0
Multiply the terms
More Steps
Evaluate
−16(−1)3
Evaluate the power
−16(−1)
Multiply the numbers
16
16≥0
Check the inequality
true
x<0 is the solutionx2=1
To determine if x>0 is the solution to the inequality,test if the chosen value x=1 satisfies the initial inequality
More Steps
Evaluate
−16×13≥0
Simplify
More Steps
Evaluate
−16×13
1 raised to any power equals to 1
−16×1
Any expression multiplied by 1 remains the same
−16
−16≥0
Check the inequality
false
x<0 is the solutionx>0 is not a solution
The original inequality is a nonstrict inequality,so include the critical value in the solution
x≤0 is the solution
Solution
x≤0
Alternative Form
x∈(−∞,0]
Show Solution
