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幾何

A(5,1), B(-3,-7), C(7,-1) 的等距點

學習如何用平方距離和線性方程組,求到 A(5,1)、B(-3,-7) 和 C(7,-1) 等距的點。

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Problem

Find the point that is equidistant from A(5,1)A(5,1), B(3,7)B(-3,-7), and C(7,1)C(7,-1).

Step 1: Write Equal-Distance Equations

Let the unknown point be P(x,y)P(x,y). To avoid square roots, compare squared distances.

Set the squared distance from PP to AA equal to the squared distance from PP to BB:

(x5)2+(y1)2=(x+3)2+(y+7)2(x-5)^2+(y-1)^2=(x+3)^2+(y+7)^2

This simplifies to:

x+y+2=0x+y+2=0

Now set the squared distance from PP to AA equal to the squared distance from PP to CC:

(x5)2+(y1)2=(x7)2+(y+1)2(x-5)^2+(y-1)^2=(x-7)^2+(y+1)^2

This simplifies to:

xy6=0x-y-6=0

Step 2: Solve the Line System

The two equations are:

x+y=2x+y=-2

and

xy=6x-y=6

Add the equations to eliminate yy:

2x=42x=4

So:

x=2x=2

Substitute back into x+y=2x+y=-2:

2+y=22+y=-2

Therefore:

y=4y=-4

So the candidate point is:

(2,4)(2,-4)

Step 3: Check the Equal Distances

Check the squared distance from (2,4)(2,-4) to each point.

To A(5,1)A(5,1):

(25)2+(41)2=(3)2+(5)2=9+25=34(2-5)^2+(-4-1)^2=(-3)^2+(-5)^2=9+25=34

To B(3,7)B(-3,-7):

(2+3)2+(4+7)2=52+32=25+9=34(2+3)^2+(-4+7)^2=5^2+3^2=25+9=34

To C(7,1)C(7,-1):

(27)2+(4+1)2=(5)2+(3)2=25+9=34(2-7)^2+(-4+1)^2=(-5)^2+(-3)^2=25+9=34

Each squared distance is 3434, so the point equidistant from AA, BB, and CC is:

(2,4)\boxed{(2,-4)}

概念

Points, Lines, Segments, and Planes

Fundamental geometric objects and their measurements. Includes the segment addition postulate, the midpoint formula, and the distance formula on the coordinate plane.

Coordinate Geometry of Lines

Using slopes in the coordinate plane to determine whether lines are parallel (equal slopes) or perpendicular (slopes are negative reciprocals). Includes finding the equation of a line through a point with a given slope condition, and the distance from a point to a line.

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