Mark and Nora both work at the same pet store. The inequality y less than or equal too 2x relates x, the number of hours Mark works each week, and y, the number of hours that Nora works. Which ordered pair must be included in the solution set of the inequality when interpreted in the context of the problem? please help(–7, 20)
(0, 0)
(8, 2)
(13, –28)
Answers
Answer:
y≤2x
Step-by-step explanation:
answer in comments
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Length of the field: 1 m
Answers
Answer:
92m².
Step-by-step explanation:
well if you just divide 5336m² with 58m² you get 92m² I think The Height is 92m²
ASAP PLEASE HELP!
Answers
Answer:-24
Hope it helps
Answers
There are 50 candies left in the jar.
What is mean by Subtraction?
Subtraction in mathematics means that is taking something away from a group or number of objects. When you subtract, what is left in the group becomes less.
Given that;
There are 79 candies in the Jar.
Aaron remove 29 candies from the jar.
Now,
Total number of candies in the jar =n 79
And, Aaron remove 29 candies from the jar.
Thus, Left candies in the jar = 79 - 29
= 50
Therefore, There are 50 candies left in the jar.
Learn more about the subtraction visit:
#SPJ2
50
Step-by-step explanation:
you just subtract the 29 from 79
Answers
mean of the population being sampled = 64
standard deviation = 6
sample size = 50
standard error of the mean=standard deviation of the original distribution
root of the sample size
standard error of the mean = 6 / √50
standard error of the mean = 6 / 7.07
standard error of the mean = 0.848 or 0.85
The mean of a population being sampled is 64, and and the standard deviation is 6.
If the sample size is 50, the standard error of the mean is 0.85. (Round off your answer to the nearest hundredth.)
correct answr
Answers
Answers
N = p(N) + s(N)
We know that the largest possible product of two single-digit numbers is 9, which occurs when both digits are 9. Therefore, p(N) ≤ 9.
The largest possible sum of two single-digit numbers is 18, which occurs when both digits are 9. Therefore, s(N) ≤ 18.
Now, let's find the unit digit of N. Since we are looking for the unit digit, we need to consider the possible values of p(N) and s(N) that result in a unit digit for N.
1. If p(N) = 9 (the maximum value for the product of two digits) and s(N) = 9 (the maximum value for the sum of two digits), then N = 9 + 9 = 18. In this case, the unit digit of N is 8.
2. If p(N) = 1 (the minimum value for the product of two digits) and s(N) = 1 (the minimum value for the sum of two digits), then N = 1 + 1 = 2. In this case, the unit digit of N is 2.
So, the possible unit digits for N are 2 and 8, depending on the values of p(N) and s(N).