SATHEE: Circle 2 Question 8

Circle 2 Question 8

9. Let $C$ be the circle with centre at $(1, 1)$ and radius 1 . If $T$ is the circle centred at $(0, y)$ passing through origin and touching the circle $C$ externally, then the radius of $T$ is equal to

(2014 Main)

(a) $\frac{\sqrt{3}}{\sqrt{2}}$

(b) $\frac{\sqrt{3}}{2}$

(d) $\frac{1}{4}$

Show Answer

Answer:

Correct Answer: 9. (d)

Solution:

PLAN Use the property, when two circles touch each other externally, then distance between the centre is equal to sum of their radii, to get required radius.

Let the coordinate of the centre of $T$ be $(0, k)$ .

Distance between their centre

$\begin{aligned} k + 1 & = \sqrt{1 + (k - 1)^{2}} [∵ C_{1} C_{2} = k + 1] \\ \Rightarrow k + 1 & = \sqrt{1 + k^{2} + 1 - 2 k} \end{aligned}$

$\begin{aligned} \Rightarrow & k + 1 & = \sqrt{k^{2} + 2 - 2 k} \\ \Rightarrow & k^{2} + 1 + 2 k & = k^{2} + 2 - 2 k \\ \Rightarrow & k & = \frac{1}{4} \end{aligned}$

So, the radius of circle $T$ is $k$ , i. e. $\frac{1}{4}$ .

Circle 2 Question 8

9. Let $C$ be the circle with centre at $(1, 1)$ and radius 1 . If $T$ is the circle centred at $(0, y)$ passing through origin and touching the circle $C$ externally, then the radius of $T$ is equal to

Answer:

Engineering Preparation

Medical Preparation

NCERT Books & Solutions

Important Resources

Other Resources

Syllabus

Test Platform

Sample Mock Test

Mentorship

NCERT Exercise Video Solution

Circle 2 Question 8

9. Let C be the circle with centre at (1,1) and radius 1 . If T is the circle centred at (0,y) passing through origin and touching the circle C externally, then the radius of T is equal to

Answer:

Engineering Preparation

Medical Preparation

NCERT Books & Solutions

Important Resources

Other Resources

Syllabus

Test Platform

Sample Mock Test

Mentorship

NCERT Exercise Video Solution

Menu

9. Let $C$ be the circle with centre at $(1, 1)$ and radius 1 . If $T$ is the circle centred at $(0, y)$ passing through origin and touching the circle $C$ externally, then the radius of $T$ is equal to