How many 2.5 inch by 6 inch tiles will fit on a back splash that is 2.5 feet tall and 8 feet long?
Answers
= 15 inches^2
Now we have to get down to the case of the backsplash
1 feet = 12 inches
Then
Length of the back splash = 8 feet
= (8 * 12) inches
= 96 inches
Height of the back splash = 2.5 feet
= (2.5 * 12) inches
= 30 inches
Then
Area of the back splash = ( 30 * 96) inches^2
= 2880 inches^2
So
The number of tiles required to fit in the back splash = 2880/15
= 192
So 192 tiles will be required to fit in the back splash. I hope the procedure is clear enough for you to understand.
Final answer:
Convert the back splash dimensions to inches. Calculate the areas of the back splash and a tile. Then divide the total area of the back splash by the tile area to get the number of tiles required, which is 192 tiles.
Explanation:
To determine the number of tiles needed, we first need to convert the dimensions of the back splash from feet to inches since the size of the tiles is given in inches. So, the back splash is 2.5 feet tall equal to 30 inches (because 1 foot = 12 inches and 2.5x12 = 30) and it is 8 feet long which is 96 inches (because 1 foot = 12 inches and 8x12 = 96).
Next, we calculate the area of the back splash by multiplying the length by the height which is 2880 square inches (30 inches x 96 inches = 2880).
Then, we find the area of a tile by multiplying the length and the width of the tile: 2.5 inch x 6 inch which equals 15 square inches.
Finally, we divide the total area of the back splash by the tile area to get the number of tiles required. So, 2880 square inches / 15 square inches equals 192 tiles.
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Answers
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The three numbers to multiply to get 63 is A = 3 x 3 x 7
Given data ,
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Let the three numbers be represented as a , b , c
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3*7*3 = 63
Answers
Answer:
About 11494.04
Step-by-step explanation:
There is no sphere shown above but I can still get you the answer:
The formula for the volume of a sphere is π*r³
Putting in the radius, we get:
*π*14³=
*π*2744=
*π=
3658.66*π≈11494.04