rakeshd347 wrote:A rectangular wall is covered entirely with two kinds of decorative tiles: regular and jumbo. 1/3 of the tiles are jumbo tiles, which have a length three times that of regular tiles and have the same ratio of length to width as the regular tiles. If regular tiles cover 80 square feet of the wall, and no tiles overlap, what is the area of the entire wall?
160
240
360
440
560
Regular tiles:
Let L=1 and W=1, so that L:W = 1:1.
Area of each regular tile = 1:1 = 1 square foot.
Since regular tiles cover 80 square feet, the total number of regular tiles = 80/1 = 80.
Jumbo tiles:
Since the length of a jumbo tile is 3 times the length of a regular tile, L = 3*1 = 3.
Since the ratio of L to W is the same in each tile, W=3, so that L:W = 3:3 = 1:1.
Area of each jumbo tile = 3*3 = 9 square feet.
Since 1/3 of the tiles are jumbo, of every 3 tiles, 1 is a jumbo, while 2 are regular.
Thus, the number of jumbo tiles is 1/2 the number of regular tiles:
(1/2) * 80 = 40.
Since there are 40 jumbo tiles, each with area of 9 square feet, the total area covered by the jumbo tiles = 40*9 = 360 square feet.
Thus:
Area of the entire wall = (regular tile area) + (jumbo tile area) = 80+360 = 440.
The correct answer is
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