Solved on Jan 30, 2024

Find the value of $x$ given a circle with two chords of lengths 6, 4, and 12.

STEP 1

The actual problem seems to be missing some crucial information, such as a diagram or additional descriptions of the positions of the chords. Without this information, we cannot determine the relationship between the given numbers and the unknown $x$ . Therefore, I will assume that the chords intersect inside the circle and that the segments given are part of the intersecting chords theorem, where the product of the segments of one chord is equal to the product of the segments of the other chord. This is a common setup for problems involving chords in a circle.
Assumptions
1. The circle contains two intersecting chords.
2. The lengths of the segments of one chord are given as 6 and 12.
3. The lengths of the segments of the other chord are given as 4 and $x$ .
4. The intersecting chords theorem applies, which states that the product of the lengths of the segments of one chord is equal to the product of the lengths of the segments of the other chord.

STEP 2

Apply the intersecting chords theorem.
$(Segment\, length\, on\, one\, side\, of\, one\, chord) \times (Segment\, length\, on\, the\, other\, side\, of\, the\, same\, chord) = (Segment\, length\, on\, one\, side\, of\, the\, other\, chord) \times (Segment\, length\, on\, the\, other\, side\, of\, the\, other\, chord)$

STEP 3

Set up the equation using the given lengths and the unknown $x$ .
$6 \times 12 = 4 \times x$

STEP 4

Calculate the product of the lengths of the segments on one chord.
$6 \times 12 = 72$

STEP 5

Write the equation with the calculated product.
$72 = 4 \times x$

STEP 6

Divide both sides of the equation by 4 to solve for $x$ .
$\frac{72}{4} = \frac{4 \times x}{4}$

STEP 7

Calculate the value of $x$ .
$x = \frac{72}{4} = 18$
The value of $x$ is 18.

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Find the value of $x$ given a circle with two chords of lengths 6, 4, and 12.

STEP 1

STEP 2

STEP 3

Set up the equation using the given lengths and the unknown $x$ .
$6 \times 12 = 4 \times x$

STEP 4

Calculate the product of the lengths of the segments on one chord.
$6 \times 12 = 72$

STEP 5

Write the equation with the calculated product.
$72 = 4 \times x$

STEP 6

Divide both sides of the equation by 4 to solve for $x$ .
$\frac{72}{4} = \frac{4 \times x}{4}$

STEP 7

Calculate the value of $x$ .
$x = \frac{72}{4} = 18$
The value of $x$ is 18.

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Find the value of xxx given a circle with two chords of lengths 6, 4, and 12.

STEP 1

STEP 2

STEP 3

Set up the equation using the given lengths and the unknown xxx.6×12=4×x 6 \times 12 = 4 \times x 6×12=4×x

STEP 4

Calculate the product of the lengths of the segments on one chord.6×12=72 6 \times 12 = 72 6×12=72

STEP 5

Write the equation with the calculated product.72=4×x 72 = 4 \times x 72=4×x

STEP 6

Divide both sides of the equation by 4 to solve for xxx.724=4×x4 \frac{72}{4} = \frac{4 \times x}{4} 472​=44×x​

STEP 7

Calculate the value of xxx.x=724=18 x = \frac{72}{4} = 18 x=472​=18The value of xxx is 18.

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Download Studdy AI Tutor now. Learn with ease and get all help you need to be successful at school.

Find the value of $x$ given a circle with two chords of lengths 6, 4, and 12.

Set up the equation using the given lengths and the unknown $x$ .
$6 \times 12 = 4 \times x$

Calculate the product of the lengths of the segments on one chord.
$6 \times 12 = 72$

Write the equation with the calculated product.
$72 = 4 \times x$

Divide both sides of the equation by 4 to solve for $x$ .
$\frac{72}{4} = \frac{4 \times x}{4}$

Calculate the value of $x$ .
$x = \frac{72}{4} = 18$
The value of $x$ is 18.