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For circle h, jn = 3, nk = x, ln = 2, and nm = 6. solve for x. circle h with chords jk and lm intersecting at n inside the circle 9 1 5 4

Answer :

MRROYALGO

The circle is an illustration of intersecting chords.

The value of x is 4

How to determine the value of x?

The given parameters are:

  • Chords: jk and lm
  • Point of intersection = n
  • jn = 3, nk = x, ln = 2, and nm = 6

This means that:

jn * nk = ln * nm

So, we have:

3 * x = 2 * 6

Divide both sides by 3

x = 2 * 2

Evaluate the product

x = 4

Hence, the value of x is 4

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