Simplify the expression. First use the distributive property to multiply and remove parentheses.
8(x+8)-35=___
8(x+8)-35 = 8*x + 8*8 -35
= 8x + 64 -35
= 8x + 29
To simplify the expression 8(x+8)-35, we will first use the distributive property to multiply 8 by both terms inside the parentheses:
8(x+8) = 8*x + 8*8
This simplifies to:
8x + 64
Now we can substitute this back into the original expression:
8x + 64 - 35
To simplify further, we can combine like terms:
8x + 29
Therefore, the simplified expression is 8x + 29.
To simplify the expression 8(x + 8) - 35, we need to use the distributive property to remove the parentheses.
The distributive property states that for any numbers a, b, and c:
a(b + c) = ab + ac
In this case, we have 8(x + 8). Multiplying 8 by both terms inside the parentheses, we get:
8(x + 8) = 8x + 8 * 8
Simplifying further:
8(x + 8) = 8x + 64
Now we can substitute this simplified expression into the original expression:
8(x + 8) - 35 = (8x + 64) - 35
To remove the parentheses, we distribute the -35 to both terms inside the parentheses:
(8x + 64) - 35 = 8x + 64 - 35
Simplifying further:
8x + 64 - 35 = 8x + 29
Therefore, the simplified expression is 8x + 29.