12ab+3ab=15ab
GCF(6a2bx, 15ab2x-24ab) = GCF[6a2bx, 3ab(5bx-8)] = 3ab
3ab
(3ab)^(2) Explanation: Simplify (3ab)^2 Use the power rule (ab)^n = a^nb^n to distribute the exponent. Raise 3 to the power of 2. 9a^2b^2
a = 1
2a-3ab = -1
3ab x 2c = 6abc
12ab+3ab=15ab
GCF(6a2bx, 15ab2x-24ab) = GCF[6a2bx, 3ab(5bx-8)] = 3ab
3ab - a - 3b2 + b = -3b2 + 3ab + b - a = -3b(b - a) + 1(b - a) = (1 - 3b)(b - a)
8ab
Factorizing 3ab + 3ac gives 3a (b + c).Factorizing is to express a number or expression as a product of factors.When factorizing always look for common factors. To factorize (3ab + 3ac) look for the highest factor between the two terms (3a). 3ab + 3ac = 3a (b + c)
(3ab)^(2) Explanation: Simplify (3ab)^2 Use the power rule (ab)^n = a^nb^n to distribute the exponent. Raise 3 to the power of 2. 9a^2b^2
-1
3ab
(3ab)^(2) Explanation: Simplify (3ab)^2 Use the power rule (ab)^n = a^nb^n to distribute the exponent. Raise 3 to the power of 2. 9a^2b^2
-2ab