Which point is a solution to the inequality shown in this graph - QAmmunity.org

Which point is a solution to the inequality shown in this graph

asked Oct 11, 2019 17.8k views

2 Answers

Step 1

Find the equation of the line of the inequality

Let

$A(-3,-1)\ B(3,3)$

Find the slope of the line

The slope is equal to

m=(y2-y1)/(x2-x1)

substitute the values

m=(3+1)/(3+3)

m=(4)/(6)

m=(2)/(3)

Find the equation of the line into point-slope form

y-y1=m(x-x1)

we have

m=(2)/(3)

(x1,y1)=B(3,3)

substitute in the equation

y-3=(2)/(3)(x-3)

y=(2)/(3)x-2+3

y=(2)/(3)x+1

Find the equation of the inequality

The solution is the shaded area above the dotted line

so the inequality is

y>(2)/(3)x+1

If a point is the solution of the inequality, then it must satisfy the inequality. Let's check each of the points

Step 2

case A)
(0,0)

Substitute the values of x and y in the inequality

$x=0\ y=0$

0>(2)/(3)*0+1

0>1 -----> is not true

therefore

the point
(0,0) is not solution of the inequality

Step 3

case B)
(3,3)

Substitute the values of x and y in the inequality

$x=3\ y=3$

3>(2)/(3)*3+1

3>3 -----> is not true

therefore

the point
(3,3) is not solution of the inequality

Step 4

case C)
(-3,-1)

Substitute the values of x and y in the inequality

$x=-3\ y=-1$

-1>(2)/(3)*-3+1

-1>-1 -----> is not true

therefore

the point
(-3,-1) is not solution of the inequality

Step 5

case D)
(0,5)

Substitute the values of x and y in the inequality

$x=0\ y=5$

5>(2)/(3)*0+1

5>1 -----> is true

therefore

the point
is a solution of the inequality

therefore

the answer is

Rahul Jha answered Oct 18, 2019

8.1k points

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