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The variable x represents the number of red bricks Layla bought and the variable y represents the number of grey bricks she bought.

Layla bought 301 red and grey bricks for a landscape project. She bought 6 times as many grey bricks as red bricks.

How many of each type of brick did she buy?

Which system of equations models the problem?

A.{x+6y=301
{y=6x

B.{x+y=301
{y=6x

C.{x−y=301
{y=6x

D.{x+y=6
{y=301x

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gabrieldavidmilGabe gabrieldavidmilGabe · Answer 1 · 2019-01-17T23:33:22+01:00

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raphealnwobi raphealnwobi · Answer 2 · 2021-11-09T11:39:20+01:00

There are 43 red bricks and 258 grey bricks and the equations are x + y = 301 and y = 6x

Let x represents the number of red bricks Layla bought and y represents the number of grey bricks she bought.

Since Layla bought 301 red and grey bricks for a landscape project, hence:

x + y = 301 (1)

Also she bought 6 times as many grey bricks as red bricks, hence:

y = 6x (2)

Solving equation 1 and 2 simultaneously gives: x = 43, y = 258

Hence there are 43 red bricks and 258 grey bricks and the equations are x + y = 301 and y = 6x

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