Solve m1v1 m^2v^2=(m1 m^2)v

Evaluate

m \times 1 \times v \times 1 \times m^{2} v^{2} = (m \times 1 \times m^{2}) v

Remove the parentheses

m \times 1 \times v \times 1 \times m^{2} v^{2} = m \times 1 \times m^{2} v

Simplify

m \times 1 \times v m^{2} v^{2} = m \times m^{2} v

Multiply the terms

More Steps

m^{3} v^{3} = m \times m^{2} v

Multiply

More Steps

m^{3} v^{3} = m^{3} v

Rewrite the expression

v^{3} m^{3} = v m^{3}

Add or subtract both sides

v^{3} m^{3} - v m^{3} = 0

Collect like terms by calculating the sum or difference of their coefficients

(v^{3} - v) m^{3} = 0

Rewrite the expression

m^{3} = 0

Solution

m = 0

Solve the equation