Question
Solve the equation
Solve for x
x=125π
Alternative Form
x≈1.308997
Evaluate
2x=(3×2π)−(2×3π)
Simplify
More Steps
Evaluate
(3×2π)−(2×3π)
Multiply the numbers
23π−(2×3π)
Multiply the numbers
23π−32π
Reduce fractions to a common denominator
2×33π×3−3×22π×2
Multiply the numbers
63π×3−3×22π×2
Multiply the numbers
63π×3−62π×2
Write all numerators above the common denominator
63π×3−2π×2
Multiply the terms
69π−2π×2
Multiply the terms
69π−4π
Subtract the numbers
More Steps
Evaluate
9π−4π
Collect like terms by calculating the sum or difference of their coefficients
(9−4)π
Subtract the numbers
5π
65π
2x=65π
Multiply by the reciprocal
2x×21=65π×21
Multiply
x=65π×21
Solution
More Steps
Evaluate
65π×21
To multiply the fractions,multiply the numerators and denominators separately
6×25π
Multiply the numbers
125π
x=125π
Alternative Form
x≈1.308997
Show Solution