Algebra
Calculus
Trigonometry
Matrix
Question
(x2−x×1)×2(y2−y×1)×2
Simplify the expression
4x2y2−4x2y−4xy2+4xy
Evaluate
(x2−x×1)×2(y2−y×1)×2
Any expression multiplied by 1 remains the same
(x2−x)×2(y2−y×1)×2
Any expression multiplied by 1 remains the same
(x2−x)×2(y2−y)×2
Multiply the terms
(x2−x)×4(y2−y)
Multiply the first two terms
4(x2−x)(y2−y)
Multiply the terms
(4x2−4x)(y2−y)
Apply the distributive property
4x2y2−4x2y−4xy2−(−4xy)
Solution
4x2y2−4x2y−4xy2+4xy
Show Solution
Factor the expression
4xy(x−1)(y−1)
Evaluate
(x2−x×1)×2(y2−y×1)×2
Any expression multiplied by 1 remains the same
(x2−x)×2(y2−y×1)×2
Any expression multiplied by 1 remains the same
(x2−x)×2(y2−y)×2
Multiply the terms
(x2−x)×4(y2−y)
Multiply the first two terms
4(x2−x)(y2−y)
Factor the expression
More Steps
Evaluate
x2−x
Rewrite the expression
x×x−x
Factor out x from the expression
x(x−1)
4x(x−1)(y2−y)
Factor the expression
More Steps
Evaluate
y2−y
Rewrite the expression
y×y−y
Factor out y from the expression
y(y−1)
4x(x−1)y(y−1)
Solution
4xy(x−1)(y−1)
Show Solution