Which describes the horizontal cross section of the given right rectangular prism? A. A rectangle with dimensions of 15 inches a
1 answer:
The <em>horizontal</em> cross section of the given <em>right rectangular</em> prism is a rectangle with dimensions of 9 inches and 7 inches. (Choice D)
<h3>How to find the dimensions of the horizontal cross section</h3>The <em>horizontal</em> cross section is <em>parallel</em> to the base of the <em>right</em> <em>rectangular</em> prism, whose dimensions are 9 inches and 7 inches, respectively. Thus, the <em>horizontal</em> cross section of the given <em>right rectangular</em> prism is a rectangle with dimensions of 9 inches and 7 inches. (Choice D)
<h3>Remark</h3>
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Answer:
minutes spent on phone (t) is directly proportional to the phone calls routed (p) with equation .
Step-by-step explanation:
Given:
Number of minutes already spent = 26 minutes
Number of minutes expected to spend on each call = 2
Let number of calls routed be 'p'
Also Let number of minutes on the phone be 't'.
We need to find the relationship between phone calls routed and mins spend on the phone.
Solution:
Now we know that;
Total minutes spent on phone is equal to Number of minutes already spent plus Number of minutes expected to spend on each call routes multiplied by number of calls routed.
framing in equation form we get;
From above we can see that whenever p increases the value of t will increase too .
Hence we can say that minutes spent on phone (t) is directly proportional to the phone calls routed (p) with equation .