Personally, I think don’t think they should. All of those factors(race, sex, culture) don’t have a big effect on intellectual ability. You can be high on the intellectually ability scale no matter race, sex, or culture.
I THINK ITS D. SODIUM
<h2>#CARRYONLEARNING</h2>
Answer:
25 quarters, 23 dimes, and 0 nickels.
Explanation:
Let n = number of nickels, q = number of quarters, and d = number of dimes
n + d = q - 2
n + d + q = 48
8.05 = .25q + .1d + .05n
so
(q-2) + q = 48
2q = 50
q = 25
Using that q value:
n + d = q - 2 --> n + d = 25 - 2 --> n + d = 23 --> n = 23 - d
Using that n value and q value:
8.05 = .25(23) + .1d + .05(23 - d)
8.05 = 5.75 + .1d + 1.15 - .05d
2.30 = 1.15 + .05d
1.15 = .05d
23 = d
Using that d value and q value:
n + d + q = 48 --> n + 23 + 25 = 48
n + 48 = 48
n = 0
Therefore there are 25 quarters, 23 dimes, and 0 nickels.
Checking that with:
8.05 = .25q + .1d + .05n
8.05 = .25(23) + .1(23) + .05(0)
8.05 = 5.75 + 2.30 + 0
8.05 = 8.05 ✓
The proportion of days for which the process will shut down for both broth x and broth in the distribution are 2.28 days and 3.34 days.
<h3>How to compute the number of days?</h3>
Mean ( u ) =4.9
Standard Deviation ( sd )=0.6
Normal Distribution = Z= (x - u)/SD
a. P(X > 6) = (6-5.2)/0.4
= 0.8/0.4 = 2
= P ( Z >2)
From the standard normal table.
= 0.0228 = 2.28 days
Broth x = 2.28 days
P(x > 6) = (6-4.9)/0.6
= 1.1/0.6 = 1.8333
= P ( Z >1.833)
From the standard normal table
= 0.0334 = 3.34 days
Broth y = 3.34 days.
The recommendation to the manager as to the broth that should be bought is broth x since it requires lesser days
Learn more about normal distribution on:
brainly.com/question/4079902
#SPJ1
Yess it does yes I just need to ask my own questions
