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Geometrie

Mögliche x-Werte bei 40 Einheiten Abstand

Nutze die Abstandsformel mit den Punkten (6, 7) und (x, -25), um eine Gleichung aufzustellen, quadriere beide Seiten und finde x = 30 oder -18.

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Problem

The distance between the points (6,7)(6, 7) and (x,25)(x, -25) is 4040 units. Find the possible values of xx.

Step 1: Identify the coordinate changes

The two points have xx-coordinates 66 and xx, and yy-coordinates 77 and 25-25.

The horizontal change is

x6x - 6

and the vertical change is

257=32.-25 - 7 = -32.

Step 2: Set up the distance formula

Using the distance formula,

d=(horizontal change)2+(vertical change)2,d = \sqrt{(\text{horizontal change})^2 + (\text{vertical change})^2},

and substituting the given distance, we get

40=(x6)2+(32)2.40 = \sqrt{(x - 6)^2 + (-32)^2}.

Step 3: Remove the square root

Square both sides to remove the square root:

402=(x6)2+(32)2.40^2 = (x - 6)^2 + (-32)^2.

So,

1600=(x6)2+1024.1600 = (x - 6)^2 + 1024.

Step 4: Isolate the squared term

Subtract 10241024 from both sides:

16001024=(x6)2.1600 - 1024 = (x - 6)^2.

Thus,

(x6)2=576.(x - 6)^2 = 576.

Step 5: Solve both square-root cases

Since

(x6)2=576,(x - 6)^2 = 576,

we have

x6=24x - 6 = 24

or

x6=24.x - 6 = -24.

Solving each equation gives

x=30x = 30

or

x=18.x = -18.

Step 6: State the possible values

Both values work because

242+322=402.24^2 + 32^2 = 40^2.

Therefore, the possible values of xx are

30 and 18.\boxed{30 \text{ and } -18}.

Konzepte

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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