Algebra
Calculus
Trigonometry
Matrix
Question
Simplify the expression
22−3x5−30x−8x2
Evaluate
1−(3×2x)x3×x−22x−13x−22x−4x2
Remove the parentheses
1−3×2xx3×x−22x−13x−22x−4x2
Divide the terms
1−3×2xx3×x−22x−13x−1×x−4x2
Divide the terms
1−3×2xx3×x−1×x−13x−1×x−4x2
Multiply
More Steps
Multiply the terms
−3×2xx3×x
Multiply the terms with the same base by adding their exponents
−3×2xx3+1
Add the numbers
−3×2xx4
Multiply the terms
More Steps
Evaluate
3×2xx4
Multiply the terms
23xx4
Multiply the terms
23x×x4
Multiply the terms
23x5
−23x5
1−23x5−1×x−13x−1×x−4x2
Multiply the terms
1−23x5−x−13x−1×x−4x2
Multiply the terms
1−23x5−x−13x−x−4x2
Subtract the terms
More Steps
Evaluate
−x−13x−x
Collect like terms by calculating the sum or difference of their coefficients
(−1−13−1)x
Subtract the numbers
−15x
1−23x5−15x−4x2
Reduce fractions to a common denominator
22−23x5−215x×2−24x2×2
Write all numerators above the common denominator
22−3x5−15x×2−4x2×2
Multiply the terms
22−3x5−30x−4x2×2
Solution
22−3x5−30x−8x2
Show Solution
