The expression "6b (3b)(6b 3b) 5" appears to be a multiplication of several terms. To simplify it, you would multiply the coefficients and combine the variables accordingly. However, without specific operations or parentheses indicating how to group the terms, it's unclear how to simplify it further. Please clarify the expression for a more accurate simplification.
6b^2 - 3b / 3b 6b^2 - 1 or ( 6b^2 - 3b) / 3b = 2b - 1 Or (6b^2 - 3b ) / 3b = 3b(2b - ) / 3b = 2b - 1
3b+6b=9b
add like terms: 3a -2a -5b + 6b +3b - 7b = a -3b
6+7a+6b
To simplify the expression (2(2a + 3b)), you distribute the 2 to both terms inside the parentheses. This results in (2 \cdot 2a + 2 \cdot 3b), which simplifies to (4a + 6b). Thus, the final result is (4a + 6b).
6b^2 - 3b / 3b 6b^2 - 1 or ( 6b^2 - 3b) / 3b = 2b - 1 Or (6b^2 - 3b ) / 3b = 3b(2b - ) / 3b = 2b - 1
3b+6b=9b
7 + 4b + 3b + 6b + 5 =7 + 13b + 5 =12 + 13b
add like terms: 3a -2a -5b + 6b +3b - 7b = a -3b
3b-4-6b-5
5b - 3 - 2b = 6b - 3 3b - 3 = 6b - 3 3b - 6b = 3 - 3 b = 0
2a+2b+3a+3b+a+b= 6a+6b 2a+3a+a=6a 2b+3b+b=6b
6+7a+6b
To simplify the expression (2(2a + 3b)), you distribute the 2 to both terms inside the parentheses. This results in (2 \cdot 2a + 2 \cdot 3b), which simplifies to (4a + 6b). Thus, the final result is (4a + 6b).
b3 - 5b2 + 12 = (b - 2)(b2 - 3b - 6)Check:(b - 2)(b2 - 3b - 6)= b(b2 - 3b - 6) - 2(b2 - 3b - 6)= b3 - 3b2 - 6b - 2b2 + 6b + 12= b3 - 5b2 + 12
It is 17b when simplified
if you mean a^5*3b^9*6a^1, the simplified form is 18a^6b^9