HOW TO WRITE LINEAR INEQUALITIES IN SLOPE INTERCEPT FORM

Example 1 :

Write the inequality for the graph given below.

Solution :

From the above graph, first let us find the slope and y-intercept.

Rise  =  - 3 and Run  =  1

Slope  =  - 3 / 1  =  - 3

y-intercept  =  4

So, the equation of the given line is

y  =  - 3x + 4

But, we need to use inequality which satisfies the shaded region.

Because the graph contains solid line, we have to use one of the signs  ≤  or  ≥.

To find the correct sign, let us take a point from the shaded region.

Take the point (2, 1) and substitute into the equation of the line.

y  =  - 3x + 4

That is, 

1  =  - 3(2) + 4 ?

1  =  - 6 + 4 ?

1  =  - 2 ?

Here, 1 is greater than -2. So, we have to choose the sign ≥ instead of equal sign in the equation y  =  -3x + 4

Therefore, the required inequality is 

y  ≥  - 3x + 4

Example 2 :

Write the inequality for the graph given below.

Solution :

From the above graph, first let us find the slope and y-intercept.

Rise  =  3 and Run  =  5

Slope  =  3 / 5 

y-intercept  =  - 5

So, the equation of the given line is

y = (3/5)x + 4

y  =  3x/5 + 4

But we need to use inequality which satisfies the shaded region.

Because the graph contains solid line, we have to use one of the signs ≤ or ≥.

Take the point (5, -3) and substitute into the equation of the line.

y  =  3x/5 + 4

-3  =  3(5)/5 + 4  ?

-3  =  3 + 4  ?

-3  =  7  ?

Here, (-3) is less than 7. So, we have to choose the sign ≤ instead of equal sign in the equation y  =  3x/5 + 4.

Therefore, the required inequality is 

y  ≤  3x/5 + 4.

Example 3 :

Write the inequality for the graph given below.

Solution :

From the above graph, first let us find the slope and y-intercept.

Rise  =  - 2 and Run  =  2

Slope  =  - 2/2  =  - 1

y-intercept  =  - 5

So, the equation of the given line is

y  =  - x - 5

But we need to use inequality which satisfies the shaded region.

Because the graph contains dotted line, we have to use one of the signs < or >.

Take the point (0, 0) and substitute into the equation of the line.

y  =  - x - 5

0  =  0 - 5  ?

0  =  - 5  ?

Here, 0 is greater than (-5). So, we have to choose the sign < instead of equal sign in the equation

y  =  - x - 5

Therefore, the required inequality is 

y  >  -x - 5

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