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Q6:
In each of the following, give also the justification of the construction:
Let ABC be a right triangle in which $AB = 6$ cm, $BC = 8$ cm and $\angle B = 90^{\circ}$. $BD$ is the perpendicular from $B$ on $AC$. The circle through $B$, $C$, $D$ is drawn. Construct the tangents from $A$ to this circle.
Solution :
Given: A right-angled triangle $ABC$ where $AB = 6$ cm, $BC = 8$ cm, and $\angle B = 90^{\circ}$. $BD$ is the altitude from $B$ to the hypotenuse $AC$. A circle is drawn passing through points $B$, $C$, and $D$.
To Find: Construct the tangents from point $A$ to the circle passing through $B$, $C$, and $D$, and provide the justification.
Step 1: Construction of Triangle ABC
1. Draw a line segment $BC = 8$ cm.
2. At point $B$, construct an angle of $90^{\circ}$ using a compass and ruler.
3. Cut an arc of $6$ cm on the perpendicular line from $B$ to mark point $A$.
4. Join $AC$. This forms the right-angled triangle $ABC$.
Step 2: Construction of the Circle
1. Draw a perpendicular from $B$ to $AC$ to locate point $D$. [Since $BD \perp AC$, $\angle BDC = 90^{\circ}$].
2. Since $\angle BDC = 90^{\circ}$, the segment $BC$ subtends a right angle at $D$. Therefore, $BC$ is the diameter of the circle passing through $B, D,$ and $C$.
3. Find the midpoint $O$ of $BC$.
4. With $O$ as the center and $OB$ as the radius, draw a circle. This circle passes through $B, D,$ and $C$.
Step 3: Construction of Tangents from A
1. Join $AO$.
2. Find the midpoint $M$ of $AO$ by drawing the perpendicular bisector of $AO$.
3. With $M$ as the center and $MA$ as the radius, draw a circle. This circle intersects the circle with center $O$ at two points. One point is $B$, and let the other point be $E$.
4. Join $AE$. $AB$ and $AE$ are the required tangents.
Justification:
1. $AB$ is already a tangent to the circle because $\angle ABO = 90^{\circ}$ (given in the triangle construction). Since $OB$ is the radius, a line perpendicular to the radius at its endpoint on the circle is a tangent.
2. For the second tangent $AE$: In the circle with center $M$, $\angle AEO = 90^{\circ}$ [Angle in a semicircle].
3. Since $OE$ is a radius of the circle with center $O$, and $AE \perp OE$ at point $E$ on the circle, $AE$ must be a tangent to the circle.
Final Answer: The tangents from point $A$ to the circle are the line segments $AB$ and $AE$, where $B$ is the vertex of the right angle and $E$ is the point of intersection of the auxiliary circle with the circle passing through $B, C, D$.
More Questions from Class 10 Mathematics Constructions EXERCISE 11.2
- Q1: In each of the following, give also the justification of the construction: Draw a circle of radius 6 cm. From a point 10 cm away from its centre, construct the pair of tangents to the circle and measure their lengths.
- Q2: In each of the following, give also the justification of the construction: Construct a tangent to a circle of radius 4 cm from a point on the concentric circle of radius 6 cm and measure its length. Also verify the measurement by actual calculation.
- Q3: In each of the following, give also the justification of the construction: Draw a circle of radius 3 cm. Take two points $P$ and $Q$ on one of its extended diameter each at a distance of 7 cm from its centre. Draw tangents to the circle from these two points $P$ and $Q$.
- Q4: In each of the following, give also the justification of the construction: Draw a pair of tangents to a circle of radius 5 cm which are inclined to each other at an angle of $60^{\circ}$.
- Q5: In each of the following, give also the justification of the construction: Draw a line segment $AB$ of length 8 cm. Taking $A$ as centre, draw a circle of radius 4 cm and taking $B$ as centre, draw another circle of radius 3 cm. Construct tangents to each circle from the centre of the other circle.
- Q7: In each of the following, give also the justification of the construction: Draw a circle with the help of a bangle. Take a point outside the circle. Construct the pair of tangents from this point to the circle.
CBSE Solutions for Class 10 Mathematics Constructions
Chapters in CBSE - Class 10 Mathematics
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