Prove that tangent segments drawn from an external point to a circle are congruent.
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Solution and Explanation
Step 1: Understanding the Concept:
We need to prove a fundamental theorem of circles which states that if we take a point outside a circle and draw two lines from it that are tangent to the circle, the lengths of these tangent segments (from the external point to the point of tangency) are equal.
Step 2: Key Formula or Approach:
The proof involves using the properties of tangents and radii, and proving the congruence of two right-angled triangles. We will use the Right-angle-Hypotenuse-Side (RHS) congruence criterion.
Step 3: Detailed Explanation:
Given: \[\begin{array}{rl} \bullet & \text{A circle with centre O.} \\ \bullet & \text{An external point P.} \\ \bullet & \text{PA and PB are two tangent segments from P to the circle at points A and B respectively.} \\ \end{array}\] To Prove: \[ \text{seg } PA \cong \text{seg } PB \text{ (or } PA = PB \text{)} \] Construction: Draw segments OA, OB, and OP.
Proof: Consider \(\triangle\)OAP and \(\triangle\)OBP. \[\begin{array}{rl} 1. & \text{\(\angle OAP = \angle OBP = 90^\circ\) \dots(Tangent-radius theorem states that the radius is perpendicular to the tangent at the point of contact)} \\ 2. & \text{seg OA \(\cong\) seg OB \dots(Radii of the same circle)} \\ 3. & \text{seg OP \(\cong\) seg OP \dots(Common side)} \\ \end{array}\] Therefore, by the Right-angle-Hypotenuse-Side (RHS) congruence rule, \[ \triangle OAP \cong \triangle OBP \] Since the triangles are congruent, their corresponding sides must be equal. \[ \therefore \text{seg } PA \cong \text{seg } PB \]
Step 4: Final Answer:
Hence, it is proved that tangent segments drawn from an external point to a circle are congruent.
Top Questions on Circles
In the following figure chord MN and chord RS intersect at point D. If RD = 15, DS = 4, MD = 8, find DN by completing the following activity:
Activity :
\(\therefore\) MD \(\times\) DN = \(\boxed{\phantom{SD}}\) \(\times\) DS \(\dots\) (Theorem of internal division of chords)
\(\therefore\) \(\boxed{\phantom{8}}\) \(\times\) DN = 15 \(\times\) 4
\(\therefore\) DN = \(\frac{\boxed{\phantom{60}}}{8}\)
\(\therefore\) DN = \(\boxed{\phantom{7.5}}\)In the following figure, circle with centre D touches the sides of \(\angle\)ACB at A and B. If \(\angle\)ACB = 52\(^\circ\), find measure of \(\angle\)ADB.
- \(\square\)ABCD is a rectangle. Taking AD as a diameter, a semicircle AXD is drawn which intersects the diagonal BD at X. If AB = 12 cm, AD = 9 cm, then find the values of BD and BX.
- In cyclic quadrilateral ABCD m\(\angle\)A = 100\(^\circ\), then find m\(\angle\)C.
- \(\angle\)ACB is inscribed angle in a circle with centre O. If \(\angle\)ACB = 65\(^{\circ}\), then what is measure of its intercepted arc AXB ?
Questions Asked in Maharashtra Class X Board exam
सरस्वती विद्यालय, कोल्हापुर में मनाए गए 'शिक्षक दिवस' समारोह का 70 से 80 शब्दों में वृत्तांत लेखन कीजिए।
(वृत्तांत में स्थल, काल, घटना का उल्लेख होना अनिवार्य है)
- Maharashtra Class X Board - 2025
- उपयोजित लेखन
- कहानी लेखन
निम्नलिखित मुद्दों के आधार पर 70 से 80 शब्दों में कहानी लिखकर उसे उचित शीर्षक दीजिए तथा सीख लिखिए :
मुद्दे: किसान के घर में चोर - घबराना - पत्नी की युक्ति - जोर-जोर से कहना - रुपए-गहने घर के पिछवाड़े बंजर जमीन में छिपा दिए हैं - चोर का बंजर जमीन खोदना - कुछ न मिलना - किसान का खुश होना।- Maharashtra Class X Board - 2025
- उपयोजित लेखन
निम्नलिखित जानकारी के आधार पर 50 से 60 शब्दों में विज्ञापन तैयार कीजिए :
- Maharashtra Class X Board - 2025
- उपयोजित लेखन
- निम्नलिखित विषयों में से किसी एक विषय पर 80 से 100 शब्दों में निबंध लिखिए :
(1) किसान की आत्मकथा
(2) भारत का चंद्रयान मिशन-3
(3) चाँदनी रात की सैर। - निम्नलिखित वाक्यों में से किसी एक वाक्य का अर्थ के आधार पर दी गई सूचनानुसार परिवर्तन कीजिए :
(1) मैं आज रात का खाना नहीं खाऊँगा। (विधानार्थक वाक्य)
(2) मानू इतना ही बोल सकी। (प्रश्नार्थक वाक्य)