The factors of 6Ab^2 are the numbers or variables that can be multiplied together to result in 6Ab^2. In this case, the factors of 6Ab^2 are 1, 2, 3, 6, A, B, A^2, B^2, AB, 2A, 3A, 6A, 2B, and 3B. These factors can be combined in various ways to represent the original expression 6Ab^2.
To find the greatest common factor (GCF) of 42a^2b and 60ab^2, we first need to break down each term into its prime factors. For 42a^2b, the prime factors are 2 * 3 * 7 * a * a * b. For 60ab^2, the prime factors are 2 * 2 * 3 * 5 * a * b * b. Comparing the prime factors of both terms, we can identify the common factors: 2, 3, a, and b. Therefore, the GCF of 42a^2b and 60ab^2 is 6ab.
12ab
3a
Since 3a is a factor of 6ab, it is automatically the GCF.
6b
6ab
2,3,2a,3a,3b,2b,3b^2,2b^2
The greatest common factor of 4ab and 6ab is 2ab. You simply take the greatest common factor from both factors. The greatest common factor of 4 and 6 is 2. The letters can be factored out because they appear in both factors
5a2 + 6ab=a(5a+6b)
6ab-3b factorize = 3
To simplify the expression 6a^2 - 6ab + 7a^2, first combine like terms. Combine the terms with the same variable (a) raised to the same power. This results in 13a^2 - 6ab as the simplified expression. Remember to keep the terms in standard form with the variable term first, followed by any constant terms.
0.3333
a3x2 - 216x2 factors to x2(a - 6)(a2 + 6a + 36)
To find the greatest common factor (GCF) of 42a^2b and 60ab^2, we first need to break down each term into its prime factors. For 42a^2b, the prime factors are 2 * 3 * 7 * a * a * b. For 60ab^2, the prime factors are 2 * 2 * 3 * 5 * a * b * b. Comparing the prime factors of both terms, we can identify the common factors: 2, 3, a, and b. Therefore, the GCF of 42a^2b and 60ab^2 is 6ab.
The factors of 23x2 are: 1, 23, x, x2, 23x, and 23x2.
12ab
6ab