Simplify −5+34(8h+12)−10h .(1 point)
To simplify the expression, we need to distribute the 34 to the terms inside the parentheses:
−5 + 34(8h + 12) − 10h = −5 + 272h + 408 − 10h
Now we can combine like terms:
−5 + 272h + 408 − 10h = (272h - 10h) + (-5 + 408)
The like terms inside the parentheses are:
272h - 10h = 262h
And the remaining terms are:
-5 + 408 = 403
Therefore, the simplified expression is:
262h + 403
To simplify the expression −5+34(8h+12)−10h, we can apply the distributive property first.
We multiply 34 by both 8h and 12:
−5 + (34 * 8h) + (34 * 12) - 10h
This simplifies to:
−5 + 272h + 408 - 10h
Now, we can combine like terms by adding or subtracting the coefficients of the same variables:
(272h - 10h) + (−5 + 408)
This simplifies further to:
262h + 403
Therefore, the simplified expression is 262h + 403.
To simplify the expression −5+34(8h+12)−10h, you need to follow the order of operations, which is parentheses, exponents, multiplication and division (from left to right), and addition and subtraction (from left to right).
First, distribute the 34 to the terms inside the parentheses: 34 * 8h = 272h and 34 * 12 = 408. Now the expression becomes −5 + 272h + 408 - 10h.
Next, combine the like terms 272h and -10h: 272h - 10h = 262h. The expression now simplifies to -5 + 262h + 408.
Finally, combine the constant terms -5 and 408: -5 + 408 = 403. The final simplified expression is 403 + 262h, or 262h + 403.