Write 'True' or 'False' and give reasons for your answer.
$AB$ is a diameter of a circle and $AC$ is its chord such that $\angle BAC = 30^{\circ}$. If the tangent at $C$ intersects $AB$ extended at $D$,then $BC = BD$.
$AB$ is a diameter of a circle and $AC$ is its chord such that $\angle BAC = 30^{\circ}$. If the tangent at $C$ intersects $AB$ extended at $D$,then $BC = BD$.
(A) True
To prove: $BC = BD$.
$1$. Join $OC$. Since $AB$ is the diameter,$\angle ACB = 90^{\circ}$ (angle in a semicircle).
$2$. In $\triangle ABC$,$\angle ABC = 180^{\circ} - (90^{\circ} + 30^{\circ}) = 60^{\circ}$.
$3$. Since $OC$ is the radius and $CD$ is the tangent,$OC \perp CD$,so $\angle OCD = 90^{\circ}$.
$4$. In $\triangle OAC$,$OA = OC$ (radii),so $\angle OCA = \angle OAC = 30^{\circ}$.
$5$. $\angle BCD = \angle OCD - \angle OCB = 90^{\circ} - (90^{\circ} - 30^{\circ}) = 30^{\circ}$.
$6$. In $\triangle BCD$,$\angle CBD = 180^{\circ} - \angle ABC = 180^{\circ} - 60^{\circ} = 120^{\circ}$ (linear pair).
$7$. In $\triangle BCD$,$\angle BDC = 180^{\circ} - (120^{\circ} + 30^{\circ}) = 30^{\circ}$.
$8$. Since $\angle BCD = \angle BDC = 30^{\circ}$,the sides opposite to these angles are equal,hence $BC = BD$.
To prove: $BC = BD$.
$1$. Join $OC$. Since $AB$ is the diameter,$\angle ACB = 90^{\circ}$ (angle in a semicircle).
$2$. In $\triangle ABC$,$\angle ABC = 180^{\circ} - (90^{\circ} + 30^{\circ}) = 60^{\circ}$.
$3$. Since $OC$ is the radius and $CD$ is the tangent,$OC \perp CD$,so $\angle OCD = 90^{\circ}$.
$4$. In $\triangle OAC$,$OA = OC$ (radii),so $\angle OCA = \angle OAC = 30^{\circ}$.
$5$. $\angle BCD = \angle OCD - \angle OCB = 90^{\circ} - (90^{\circ} - 30^{\circ}) = 30^{\circ}$.
$6$. In $\triangle BCD$,$\angle CBD = 180^{\circ} - \angle ABC = 180^{\circ} - 60^{\circ} = 120^{\circ}$ (linear pair).
$7$. In $\triangle BCD$,$\angle BDC = 180^{\circ} - (120^{\circ} + 30^{\circ}) = 30^{\circ}$.
$8$. Since $\angle BCD = \angle BDC = 30^{\circ}$,the sides opposite to these angles are equal,hence $BC = BD$.
Explore More
Similar Questions
Point $A$ lies in the exterior of $\odot(P, 10)$. $A$ line from $A$ touches the circle at $B$. If $PA = 26$,then find the length of $AB$.
Medium
View Solution$\overline{PA}$ is a tangent to $\odot(O, r)$ drawn from a point $P$ outside a circle. If $m\angle AOP = 40^\circ$,then $m\angle OPA = \ldots$ (in $^\circ$)
Medium
View SolutionIn $\Delta ABC$,$\angle B = 90^{\circ}$. The radius of the incircle touching all three sides of the triangle is $\ldots \ldots \ldots \ldots$
Easy
View Solution$A$ circle touches all the sides of a quadrilateral $ABCD$. Then, the quadrilateral $ABCD$ is a:
Medium
View Solution$A$ is a point at a distance $13\, cm$ from the centre $O$ of a circle of radius $5 \,cm$. $AP$ and $AQ$ are the tangents to the circle at $P$ and $Q$. If a tangent $BC$ is drawn at a point $R$ lying on the minor arc $PQ$ to intersect $AP$ at $B$ and $AQ$ at $C$,find the perimeter of the $\triangle ABC$. (in $cm$)
Difficult
View SolutionVedclass Products
For Students
Vedclass Test Series
Mock tests in real JEE/NEET style with performance analysis. 5-day free trial.
Start Free TrialFor Teachers
Exam Paper Generator
Generate Set A/B/C/D exam papers from 7.5L+ questions in 2 minutes. 3 chapters free.
Try FreeFor Institutes
Online Exam Module
Live online exams with unlimited students, 360° analytics & white-label branding.
See Demo