Answer:
250 batches of muffins and 0 waffles.
Step-by-step explanation:
-1
If we denote the number of batches of muffins as "a" and the number of batches of waffles as "b," we are then supposed to maximize the profit function
P = 2a + 1.5b
subject to the following constraints: a>=0, b>=0, a + (3/4)b <= 250, and 3a + 6b <= 1200. The third constraint can be rewritten as 4a + 3b <= 1000.
Use the simplex method on these coefficients, and you should find the maximum profit to be $500 when a = 250 and b = 0. So, make 250 batches of muffins, no waffles.
You use up all the dough, have 450 minutes left, and have $500 profit, the maximum amount.
7/8times16/1 gives 112/8, which is 14.
you multiply both numerators over both denominators.
Answer:
4(4g+5h)
Step-by-step explanation:
Factor out the 4.
Answer: 
Step-by-step explanation:
For this exercise you need to remember the Power of a power property. This states that:
You know that the given expression 
is used to determine points earned, and "n" represents the game level.
Therefore, knowing this, you can to substitute 
into the expression :
Finally, in order to simplify the expression for the level, you must apply the Power of a power property mentioned before.
Therefore, you get:
Answer:
2^3*7
Step-by-step explanation:
56=7*8=2^3*8
