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Hint |
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1) Midas is building a stone wall that will measure 3 ft long and 8 ft tall. He uses blocks
measuring 1/8 ft by 1/3 ft by 1/2 ft. He wants the wall to be as thin as possible. How many
blocks will he need to build the wall? |
1. If Midas wants the wall to be as thin as possible the ____ dimension will be the thickness, leaving the wall to be built by blocks of length ____ ft. and height _____ ft.
2. Compute the area of one of these blocks: _____ sq. ft.
3. Compute the area of the wall: _____ sq. ft.
4. Divide the area of the wall by the area of one block to get the number of blocks: _____ blocks.
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2) You have an oven that can cook 5 pizzas in 12 minutes. At this rate, what is the maximum
number of pizzas that you can cook in 14 hours? |
1. Compute the number of pizzas that can be cooked in an hour =
5 pizzas/12 min = _____ pizzas/hour.
2. Multiply this by the number of hours = _____ pizzas.
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3) Zona lives in a bubble where time moves 1/3 slower than normal. If a clock in Zona's bubble
matches a normal clock at 1:23 pm, what time will a normal clock display when Zona's clock
reads 3:51 pm? |
1. If Zona's clock is 1/3 slower, then the normal clock will display a later time.
2. For every normal hour, Zona's clock advances _____ minutes.
3. The equation for this is:
Z = (1 - 1/3)N where Z = Zona's time and N = normal time.
4. Compute the amount of Zona's time between
1:23 pm and 3:51 pm = ____ minutes.
5. Turn the above equation around to be an equation for N:
N = _______________
6. Using your turned-around equation, compute the amount of normal time that transpired = _____ minutes = ____ hours _____ minutes.
7. Add this to the start time = _____.
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