The expression ( b^2 b^3 a ) can be simplified by combining the like terms. When multiplying terms with the same base, you add their exponents. Therefore, ( b^2 b^3 ) simplifies to ( b^{2+3} = b^5 ). Thus, the simplified expression is ( b^5 a ).
The expression (3a \times a \times b) can be simplified by multiplying the coefficients and combining like terms. This results in (3a^2b), where (3) is the coefficient, (a) is squared, and (b) remains as is. Thus, the final answer is (3a^2b).
The expression (3a + 2b) is already in its simplest form, as it cannot be combined further without specific values for (a) and (b). It represents a linear combination of the variables (a) and (b) with coefficients 3 and 2, respectively.
To simplify the expression ( 6a - 2b + 3(a - b) ), first distribute the ( 3 ) in the term ( 3(a - b) ), which gives ( 3a - 3b ). Combining like terms, we have ( 6a + 3a - 2b - 3b ), resulting in ( 9a - 5b ). Thus, the simplified expression is ( 9a - 5b ).
To simplify the expression ( b + 5a + 7 - 3a - 2 + 2b ), first combine like terms. The ( b ) terms are ( b + 2b = 3b ), and the ( a ) terms are ( 5a - 3a = 2a ). For the constant terms, combine ( 7 - 2 = 5 ). Thus, the simplified expression is ( 3b + 2a + 5 ).
The expression (3a \times 2b) can be simplified by multiplying the coefficients and the variables separately. The coefficients 3 and 2 multiply to give 6, while the variables (a) and (b) remain as they are. Therefore, the simplified expression is (6ab).
The expression (3a \times a \times b) can be simplified by multiplying the coefficients and combining like terms. This results in (3a^2b), where (3) is the coefficient, (a) is squared, and (b) remains as is. Thus, the final answer is (3a^2b).
It is an expression that can be simplified to: 3a-2b+c
The given expression can be simplified to: 3b-a
2a+2b+3a+3b+a+b= 6a+6b 2a+3a+a=6a 2b+3b+b=6b
The expression (3a + 2b) is already in its simplest form, as it cannot be combined further without specific values for (a) and (b). It represents a linear combination of the variables (a) and (b) with coefficients 3 and 2, respectively.
The expression 2b x 5b can be simplified by multiplying the coefficients (2 and 5) together to get 10, and then multiplying the variables (b and b) together to get b^2. Therefore, the answer is 10b^2.
To simplify the expression ( 6a - 2b + 3(a - b) ), first distribute the ( 3 ) in the term ( 3(a - b) ), which gives ( 3a - 3b ). Combining like terms, we have ( 6a + 3a - 2b - 3b ), resulting in ( 9a - 5b ). Thus, the simplified expression is ( 9a - 5b ).
To simplify the expression ( b + 5a + 7 - 3a - 2 + 2b ), first combine like terms. The ( b ) terms are ( b + 2b = 3b ), and the ( a ) terms are ( 5a - 3a = 2a ). For the constant terms, combine ( 7 - 2 = 5 ). Thus, the simplified expression is ( 3b + 2a + 5 ).
The expression (3a \times 2b) can be simplified by multiplying the coefficients and the variables separately. The coefficients 3 and 2 multiply to give 6, while the variables (a) and (b) remain as they are. Therefore, the simplified expression is (6ab).
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What is the answers to -7 ( a + b - 5 ) + 8 ( -3a +2b ) + b ( 7 + 3 )
3a + 2b is an expression in algebra. If you make 3a + 2b equal to something then you can find the values of "a" and "b" Lets say you make 3a + 2b equal to 23 3a + 2b = 23 Now find "a" and "b" to make this equation true... 3(5) + 2(4) = 23 15 + 8 = 23 23 = 23 Correct So in this case a=5 and b=4