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This is grade 10 math. Chapter 2: Analytic Geometry - Line Segments and CirclesDescribe all points that are the same distance from points A(-3,-1) and B(5,3)It’s question 3 from attached screenshot.The answer at the back of text book is y=-2x+3Thank you!

User Enigmatic
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Given:

The given points are A(-3,-1) and B(5,3).

Required:

We need to find the set of all points that are the same distance from the points A(-3,-1) and B(5,3).

Step-by-step explanation:

Recall that the set of points that are the same distance from the point A(-3,-1) and (5,3) is the perpendicular bisector of the line segment AB.

Consider the slope formula.


slope=(y_2-y_1)/(x_2-x_1)
Substitute\text{ }y_2=3,y_1=-1,x_2=5,\text{ and }x_1=-3\text{ in the formula to find the slope of AB.}


slope=(3-(-1))/(5-(-3))=(3+1)/(5+3)=(4)/(8)=(1)/(2)

We get the slope of the line segment AB is 1/2.

The slope of the perpendicular is the negative reciprocal of the slope of the line segment AB.


The\text{ negative reciprocal of }(1)/(2)=-2.


The\text{ slope of the perpendicular line is -2.}

The perpendicular line is passing through the midpoint of A(-3,-1) and B(5,3).

Consider the midpoint formula.


midpoint=((x_1+x_2)/(2),(y_1+y_2)/(2))


Substitute\text{ }y_2=3,y_1=-1,x_2=5,\text{ and }x_1=-3\text{ in the formula to find the midpoint of AB.}


midpoint=((-3+5)/(2),(-1+3)/(2))
midpoint=((2)/(2),(2)/(2))
midpoint=(1,1)

Consider the general form of the line equation.


y=mx+b

Substitute m=-2, x=1, and y=1 in the line equation to find b.


1=(-2)(1)+b
1=-2+b

Add 2 to both sides of the equation.


1+2=-2+b+2
3=b

Substitute m=-2 and b=3 in the line equation.


y=-2x+3

We get the perbenticular bisector y =-2x+3.

Final answer:


y=-2x+3

User Gigablah
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