Simplify −5+34(8h+12)−10h
To simplify the expression −5+34(8h+12)−10h, we first apply the distributive property to the term 34(8h+12):
34(8h+12) = 34(8h) + 34(12) = 272h + 408
Now the expression becomes:
−5 + 272h + 408 − 10h
Next, we combine like terms:
(272h - 10h) + (-5 + 408)
Simplifying further:
262h + 403
So, the simplified expression is 262h + 403.
To simplify the expression −5 + 34(8h + 12)−10h, we need to apply the distributive property and combine like terms.
First, let's simplify the expression inside the parentheses:
34(8h + 12) can be expanded as:
= 34 * 8h + 34 * 12
= 272h + 408
Now, substitute this simplified expression into the original expression:
−5 + 272h + 408 − 10h
Next, combine the like terms:
272h − 10h can be simplified as 262h.
Now, substitute the simplified expression back into the original expression:
−5 + 262h + 408
Finally, combine the constants -5 and 408:
−5 + 408 = 403
So, the simplified expression is:
403 + 262h.
To simplify the expression −5 + 34(8h + 12) − 10h, we can follow the order of operations (PEMDAS/BODMAS).
First, let's apply the distributive property by multiplying 34 to each term inside the parentheses.
−5 + 34 * 8h + 34 * 12 − 10h
Since there are no like terms to simplify within the parentheses, we can distribute 34 to both terms inside.
−5 + 272h + 408 − 10h
Next, we combine like terms by adding or subtracting coefficients of the same variable.
(−5 + 408) + (272h − 10h)
−5 + 408 equals 403, and 272h − 10h equals 262h:
403 + 262h
Therefore, the simplified form of the expression −5 + 34(8h + 12) − 10h is 403 + 262h.