Answer:
The correct answer would be A, Onions.
Explanation:
Meat, vegetables, herbs, etc are simmered with water on a low to medium flame to make a broth. Broths are usually thin and after some time, due to simmering, it starts to get body. The nutrients in the meat or vegetables or herbs start to mix in the water and give it a delicious taste. But the broth is still thin and needs to be thickened. So in order to make the broth thick, we need to add onions into the broth. Now when it will cook on a slow flame, the broth will get a hearty body and all the nutrients of the broth will make an appetizing dish.
Answer:
maximum profit = $7500
so correct option is c $7500
Explanation:
given data
mean = 500
standard deviation = 300
cost = $10
price = $25
Inventory salvaged = $5
to find out
What is its maximum profit
solution
we get here maximum profit that is express as
maximum profit = mean × ( price - cost ) ..................................1
put here value in equation 1 we get maximum profit
maximum profit = mean × ( price - cost )
maximum profit = 500 × ( $25 - $10 )
maximum profit = 500 × $15
maximum profit = $7500
so correct option is c $7500
Answer:
A
Explanation:
developing countries have high population growth rate
8 lol just saying just saying I think it’s right
Answer:
Monthly payment is $840.12
Explanation:
we are given: $70000 which is the present value of the loan Pv
12% compounded monthly where the interest rate is adjusted to monthly where i = 12%/12
the period in which the loan will be repaid in 15years which contain 15x12 = 180 monthly payments which is n
we want to solve for C the monthly loan repayments on the formula for present value as we are looking for future periodic payments.
Pv = C[((1- (1+i)^-n)/i] thereafter we substitute the above mentioned values and soolve for C.
$70000= C[((1-(1+(12%/12))^-180))/(12%/12)] then compute the part that multiplies C in brackets and divide by it both sides.
$70000/83.32166399 = C then you get the monthly loan repayments
C = $840.12 which is the monthly repayments of the $70000 loan.