(r + 5)/b
The answer is b+1. Therefore the algebraic expression for this is b+1
It could be a^3 + b or (a + b)^3, depending on the context.
There is no difference between vector addition and algebraic addition. Algebraic Addition applies to vectors and scalars: [a ,A ] + [b, B] = [a+b, A + B]. Algebraic addition handles the scalars a and b the same as the Vectors A and B
If -5 + b = 3, then b = 8.
It is an algebraic expression in the form of: b+14
b/12 - 11 = -5
7
b + 1 is b plus 1 as an algebraic expression.
21/b + 1
It is: b+b+b = 3b
The answer is b+1. Therefore the algebraic expression for this is b+1
21b + 1
It is an algebraic expression in the form of: b+14
It could be a^3 + b or (a + b)^3, depending on the context.
The algebraic expression is 3(b+5).
It is an algebraic expression because it has no equality sign.
To determine the quotient in polynomial form, we need to perform polynomial long division or synthetic division based on the given coefficients -1, 2, 7, and 5. The options suggest a linear polynomial as the quotient. Without the specific divisor, it is difficult to provide a definitive answer, but the correct quotient can depend on the context of the division. Please provide the divisor for a precise solution.