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Question 747408: I am not sure if this is going to make any sense but. I need to get the recommended weight range for a person that is 69 inches tall. The weight change is about _ to_ lbs.
According to the graph that they provided (I do not know how to show that graph here). This is what I have, I just cannot find the weights.
25h-7w≤800
5h-w≥170
25(69)-7w=800
H=69
1725-7w=800
-7=-925
Rounded to the nearest integer, the lower limit for the recommended weight for 69 inches is?
Then the second inequality has an equation 5h-w=170 subbing h=69 is
5(69)-w=170
Solve for the upper limit weight
? I’m lost!
Answer by MathTherapy(10552)   (Show Source):
You can put this solution on YOUR website!
I am not sure if this is going to make any sense but. I need to get the recommended weight range for a person that is 69 inches tall. The weight change is about _ to_ lbs.
According to the graph that they provided (I do not know how to show that graph here). This is what I have, I just cannot find the weights.
25h-7w≤800
5h-w≥170
25(69)-7w=800
H=69
1725-7w=800
-7=-925
Rounded to the nearest integer, the lower limit for the recommended weight for 69 inches is?
Then the second inequality has an equation 5h-w=170 subbing h=69 is
5(69)-w=170
Solve for the upper limit weight
? I’m lost!
Apparently, the lower weight-limit inequality is:  , with h = 69. When solved, we get:  . Therefore, for a 69" person, the lower weight limit, or  lbs.
The upper weight-limit inequality is:  , with h = 69. When solved, we get:  . Therefore, for a 69" person, the upper weight limit, or  lbs.
This means that a 69" person's weight limit is:  , or about  lbs to  lbs
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