- 60 degrees of 6 inch radius pizza for $1.50
- 45 degrees of 7 inch radius pizza for $1.70
0 voters
No, I’ve done exams recently. I don’t want any more of this yet.
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do you like pizza (serious question)
I just want the long one since it’s easier to eat
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Yes, but I’m not calculating which one is a better bargain, I would just take whatever one I found first.
Without doing any equations, I think the $1.50 gets more pizza
Edit: I found the answer
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The cheaper one cause I’m a broke student
the 60 degree one is less pizza per slice i think but it’s more pizza per dollar, so i’m taking that
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I’m going to the sushi restaurant next door I ain’t doing this shit
2 Likes
wouldn’t you use πr² instead to find the area
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how did you mess up so badly 
Actually yeah. Can’t believe I forgot math.
In that case the 45* 7 inch pizza is in fact better at 19.24 inches^2 and the other slice at 18.85 inches^2. A difference of 0.4 inches^2
So is 20 cents worth 0.4 square inches of pizza?
yea, you get more pizza per price
1 square inch of pizza based off of the 6 inch slice is worth about 13 cents while 1 square inch of the 7 inch is worth about 11 cents.
So the 7 inch is in-fact the better one to buy. Fascinating, I thought for sure they were trying to rip you off.
the first pizza you get 0.04π inches² per 1 cent, the second one you get ~0.036π inches² per 1 cent, it is more pizza per price i think
so the 7 inch is better. I guess if you can’t trust corporate greed you can trust math to tell you “your paranoid”.
the 7 inch is literally less pizza per 1 cent
according to my calculations
the 6 inch one is better
calculations
((6^2) * (60/360)) / 1.5 = 4
((7^2) * (45/360)) / 1.7 = ~3.6029
i ignored pi since it wouldnt make a difference
higher number = better
oh, wait I’m doing math all wrong. My brain is kurfuzzled after avoiding math during the summer.