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14 votes
14 votes
A farmer has 100 animals on his farm.The animals consist of cows & chickens.Given that there are 286 legs altogether among the animals, how many cows are there?

User Divya Motiwala
by
3.1k points

1 Answer

20 votes
20 votes

Let

x -----> the number of cows

y -----> the number of chickens

we know taht

x+y=100 ------> equation A

4x+2y=286 ------> equation B

solve the system of equations by graphing

remember that the solution is the intersection point both graphs

using a graphing tool

see the attached figure

the solution is (43,57)

therefore

43 cows

57 chickens

we have the system

x+y=100 --------> equation A

4x+2y=286 -------> equation B

step 1

isolate the variable x in equation A

x=100-y -------> equation C

step 2

substitute equation C in equation B

4(100-y)+2y=286

solve for y

400-4y+2y=286

-2y=286-400

-2y=-114

y=57 chickens

Find the value of x

substitute the value of y in equation C

x=100-57

x=43 cows

This method is called solve the system by substitution

A farmer has 100 animals on his farm.The animals consist of cows & chickens.Given-example-1
User Minh Kha
by
2.9k points
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