In the figure, AB = AC = CD, &ang;ADC = 38°. Calculate: (i) &ang; ABC, (ii) &ang; BEC.

(i) ∵ AC = CD&there4; &ang; CAD = &ang; ADC = 38°Now, in Δ ACD,&ang; ACD + &ang; CAD + &ang; ADC = 180°⇒ &ang; ACD + 38° + 38° = 180°⇒ &ang; ACD = 104°Now, ⇒ &ang; ACB + &ang; ACD = 180°⇒ &ang; ACB + 104° = 180°⇒ &ang; ACB = 76° Again, AB = AC&there4; &ang; ABC = &ang; ACB = 76° (ii) In Δ ABC,&ang; BAC + &ang; ABC + &ang; ACB = 180°⇒ &ang; BAC + 76° + 76° = 180°⇒ &ang; BAC = 28°Now, &ang; BEC = &ang; BAC = 28° ....(Angles subtended by the same chord)

In the Figure, Ab = Ac = Cd, ∠Adc = 38°. Calculate: (I) ∠ Abc, (Ii) ∠ Bec. - Mathematics

प्रश्न

In the figure, AB = AC = CD, ∠ADC = 38°. Calculate: (i) ∠ ABC, (ii) ∠ BEC.

योग

उत्तर

(i) ∵ AC = CD
∴ ∠ CAD = ∠ ADC = 38°
Now, in Δ ACD,
∠ ACD + ∠ CAD + ∠ ADC = 180°
⇒ ∠ ACD + 38° + 38° = 180°
⇒ ∠ ACD = 104°
Now,
⇒ ∠ ACB + ∠ ACD = 180°
⇒ ∠ ACB + 104° = 180°
⇒ ∠ ACB = 76°

Again, AB = AC
∴ ∠ ABC = ∠ ACB = 76°

(ii) In Δ ABC,
∠ BAC + ∠ ABC + ∠ ACB = 180°
⇒ ∠ BAC + 76° + 76° = 180°
⇒ ∠ BAC = 28°
Now, ∠ BEC = ∠ BAC = 28° ....(Angles subtended by the same chord)

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Theorem: Angles in the Same Segment of a Circle Are Equal.

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Q 50 Q 49 Q 51

अध्याय 15: Circles - Exercise 2