The last option ,KH and LM
The Solution:
Given:
We are asked to write the inequality that represents each situation.
Case 1:
Using d to represent the distance (in feet) to the nearest exit door, we have
Case 2:
Using t to represent the time (in minutes) of a runner who qualifies for the
championship, we have:
The number of sixty-minute cassette tapes ordered is 288 and the number of CDs ordered is 163.
<h3>What are the linear equations that represent this question?</h3>
1.49a + 4.98b = $1240.86 equation 1
a + b = 451 equation 2
Where:
- a = number of sixty-minute cassette tapes ordered
- b = number of CDs ordered
<h3>How many
CDs were ordered?</h3>
Multiply equation 2 by 1,49
1.49a + 1.49b = 671.99 equation 3
Subtract equation 3 from equation 1
568.87 = 3.49b
Divide both sides of the equation by 3.49
568.87 / 3.49
b = 163
<h3>How many s
ixty-minute cassette tapes were ordered ?</h3>
Subract 163 deom 451
451- 163 = 288
To learn more about simultaneous equations, please check: brainly.com/question/25875552
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