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The distance between the centers of two circles is d. The lengths of their direct and transverse common tangents are L and M, respectively. If L² + M² = 200 and the sum of the squares of their radii is 100, what is the value of d?

A10

B10√2

C5√2

D20

Answer:

B. 10√2

Read Explanation:

Let radii be (R) and (r), and distance between centers be (d).

For common tangents:

  • Direct tangent:
    [
    L^2 = d^2 - (R - r)^2
    ]

  • Transverse tangent:
    [
    M^2 = d^2 - (R + r)^2
    ]


Step 1: Add both equations

[
L^2 + M^2 = 2d^2 - [(R - r)^2 + (R + r)^2]
]

Use identity:
[
(R - r)^2 + (R + r)^2 = 2(R^2 + r^2)
]

So:
[
L^2 + M^2 = 2d^2 - 2(R^2 + r^2)
]


Step 2: Substitute given values

[
200 = 2d^2 - 2(100)
]

[
200 = 2d^2 - 200
]


Step 3: Solve

[
400 = 2d^2
]

[
d^2 = 200
]

[
d = \sqrt{200} = 10\sqrt{2}
]


✅ Final Answer:

[
\boxed{10\sqrt{2}}
]


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