Let be the circle in the third quadrant of radius , that touches both coordinate axes. Let be the circle with center that touches externally at the point . If , and , then is equal to:
- A
- B
- C
- D
Let be the circle in the third quadrant of radius , that touches both coordinate axes. Let be the circle with center that touches externally at the point . If , and , then is equal to:
Correct answer:C
Standard Method
Given: is in the third quadrant, has radius , and touches both coordinate axes. Hence its centre is . Circle has centre and touches externally at .
Find: if .
For , the equation is
The distance between the centres is
Since the circles touch externally,
So,
which gives
The point of external contact divides the line joining the centres internally in the ratio of the radii. Therefore, using the section formula,
with , , , and .
So,
Simplifying,
Now,
Hence,
Thus, and .
Therefore, . The correct option is C.
Using the line of centres
Given: The centre of is because a circle of radius touching both axes in the third quadrant must be units left of the -axis and units below the -axis. The centre of is .
Find: .
A common the solution's step incorrectly places the centre of at . That is not consistent with the phrase third quadrant. The correct centre is , and the correct working is based on that.
Since the circles touch externally, the contact point lies on the line segment joining the centres, and the radii to the point of contact are collinear. So the contact point divides in the ratio
This directly leads to the section formula used above.
After finding
we identify and , which are coprime. Therefore,
So the correct option is C.
Placing the centre of at is wrong because the circle is stated to be in the third quadrant. A circle of radius touching both axes there must have centre . Always use the quadrant information before writing the centre.
Using the external-touch condition incorrectly can lead to impossible values such as a negative radius. For externally touching circles, the distance between centres equals the sum of radii, so here , not any other expression.
Applying the section formula with the wrong endpoints or wrong ratio gives incorrect coordinates of . The point of contact lies on the line joining the centres and divides it internally in the ratio of the radii .
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