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I wonder if they do this on purpose?
This Mensa calendar seems to have one bad page per month. I enjoy the little brain exercises every day, but ones like this drive me up the wall:
Eight chocolate bars plus six gumdrops cost 70¢. You could buy seven gumdrops for the price of two chocolate bars. How much change will you get back from $1.00 if you buy six of each?
The answer is: What fucking planet do these guys come from? Let's just check their math.
8c + 6g = 70¢
7g = 2c ... 3.5g = c
Okay, now let's substitute.
8(3.5g) + 6g = 70¢ ... 28g + 6g = 70¢ ... 34g = 70¢
Unless I've done something wrong, 34 gumdrops cost 70¢
That means one gumdrop = 2.0588235294117647058823529411765¢
But hang on...
7g = 2c ... g = 2/7c
8c + 6(2/7c) = 70¢ ... 8c + 12/7c = 70¢ ... 68/7c = 70¢ ... 68c = $4.90
Therefore a chocolate bar costs 7.2058823529411764705882352941176¢
If you bought 6 gumdrops and 6 chocolate bars you would get 44.411764705882352941176470588242¢ back in change.
Their expected answer:
ANSWER: 46¢ (A chocolate bar costs 7¢; a gumdrop costs 2¢.)
Hmph. They didn't say anything about rounding to the nearest cent in the original problem.
Eight chocolate bars plus six gumdrops cost 70¢. You could buy seven gumdrops for the price of two chocolate bars. How much change will you get back from $1.00 if you buy six of each?
The answer is: What fucking planet do these guys come from? Let's just check their math.
8c + 6g = 70¢
7g = 2c ... 3.5g = c
Okay, now let's substitute.
8(3.5g) + 6g = 70¢ ... 28g + 6g = 70¢ ... 34g = 70¢
Unless I've done something wrong, 34 gumdrops cost 70¢
That means one gumdrop = 2.0588235294117647058823529411765¢
But hang on...
7g = 2c ... g = 2/7c
8c + 6(2/7c) = 70¢ ... 8c + 12/7c = 70¢ ... 68/7c = 70¢ ... 68c = $4.90
Therefore a chocolate bar costs 7.2058823529411764705882352941176¢
If you bought 6 gumdrops and 6 chocolate bars you would get 44.411764705882352941176470588242¢ back in change.
Their expected answer:
ANSWER: 46¢ (A chocolate bar costs 7¢; a gumdrop costs 2¢.)
Hmph. They didn't say anything about rounding to the nearest cent in the original problem.
no subject