Simplify −5+34(8h+12)−10h.
To simplify the expression, we use the distributive property and combine like terms.
−5+34(8h+12)−10h
= −5 + 34(8h) + 34(12) − 10h (Distribute)
= −5 + 272h + 408 - 10h (Multiply)
= 262h + 403 (Combine like terms)
So, the simplified expression is 262h + 403.
sorry that's 3/4
I apologize for the confusion. Let's simplify the expression again:
−5 + 34(8h + 12) − 10h
Using the distributive property:
−5 + 272h + 408 − 10h
Combining like terms:
(272h - 10h) + (-5 + 408)
Simplifying:
262h + 403
So, the simplified expression is 262h + 403.
To simplify the expression −5 + 34(8h + 12) − 10h, let's follow these steps:
Step 1: Distribute the multiplication.
-5 + 34 * 8h + 34 * 12 - 10h
Step 2: Simplify the multiplication.
-5 + 272h + 408 - 10h
Step 3: Combine like terms.
(272h - 10h) + (-5 + 408)
(262h) + (403)
Step 4: Simplify further if possible.
262h + 403
Therefore, the simplified expression is 262h + 403.
To simplify the expression −5+34(8h+12)−10h, we need to follow the order of operations (PEMDAS/BODMAS).
1. Start by simplifying the expression within the parentheses. Multiply 34 by each term inside the parentheses:
34 * 8h = 272h
34 * 12 = 408
2. Rewrite the expression by substituting the simplified expressions:
−5 + 272h + 408 − 10h
3. Combine like terms. Add all the h terms and the constant terms separately:
(272h - 10h) + (-5 + 408)
The h terms can be combined:
272h - 10h = 262h
The constant terms can be combined:
-5 + 408 = 403
4. Rewrite the expression with the simplified terms:
262h + 403
Therefore, the simplified expression is 262h + 403.