Class 9 Exam > Class 9 Notes > Extra Documents & Tests for Class 9 > NCERT Solutions Chapter 11 - Constructions (II), Class 9, Maths
NCERT Solutions for Class 9 Maths Chapter 11 - Chapter 11 - Constructions (II),
Exercise 11.2
1. Construct a triangle ABC in which BC = 7cm, ∠B = 75° and AB + AC = 13 cm.
Answer
Steps of Construction:
Step 1: A line segment BC of 7 cm is drawn.
Step 2: At point B, an angle ∠XBC is constructed such that it is equal to 75°.
Step 3: A line segment BD = 13 cm is cut on BX (which is equal to AB+AC).
Step 3: DC is joined and ∠DCY = ∠BDC is made.
Step 4: Let CY intersect BX at A.
Thus, ΔABC is the required triangle.
2. Construct a triangle ABC in which BC = 8cm, ∠B = 45° and AB - AC = 3.5 cm.
Answer
Steps of Construction:
Step 1: A line segment BC = 8 cm is drawn and at point B, make an angle of 45° i.e. ∠XBC.
Step 2: Cut the line segment BD = 3.5 cm (equal to AB - AC) on ray BX.
Step 3: Join DC and draw the perpendicular bisector PQ of DC.
Step 4: Let it intersect BX at point A. Join AC.
Thus, ΔABC is the required triangle.
3. Construct a triangle PQR in which QR = 6cm, ∠Q = 60° and PR – PQ = 2cm.
Answer
Steps of Construction:
Step 1: A ray QX is drawn and cut off a line segment QR = 6 cm from it.
Step 2:. A ray QY is constructed making an angle of 60º with QR and YQ is produced to form a line YQY'
Step 3: Cut off a line segment QS = 2cm from QY'. RS is joined.
Step 5: Draw perpendicular bisector of RS intersecting QY at a point P. PR is joined.
Thus, ΔPQR is the required triangle.
4. Construct a triangle XYZ in which ∠Y = 30°, ∠Z = 90° and XY + YZ + ZX = 11 cm.
Answer
Steps of Construction:
Step 1: A line segment PQ = 11 cm is drawn. (XY + YZ + ZX = 11 cm)
Step 2: An angle, ∠RPQ = 30° is constructed at point A and an angle ∠SQP = 90° at point B.
Step 3: ∠RPQ and ∠SQP are bisected . The bisectors of these angles intersect each other at point X.
Step 4: Perpendicular bisectors TU of PX and WV of QX are constructed.
Step V: Let TU intersect PQ at Y and WV intersect PQ at Z. XY and XZ are joined.
Thus, ΔXYZ is the required triangle.
5. Construct a right triangle whose base is 12cm and sum of its hypotenuse and other side is 18 cm.
Answer
Steps of Construction:
Step 1: A ray BX is drawn and a cut off a line segment BC = 12 cm is made on it.
Step 2: ∠XBY = 90° is constructed.
Step 3: Cut off a line segment BD = 18 cm is made on BY. CD is joined.
Step 4: Perpendicular bisector of CD is constructed intersecting BD at A. AC is joined.
Thus, ΔABC is the required triangle.
The document NCERT Solutions for Class 9 Maths Chapter 11 - Chapter 11 - Constructions (II), is a part of the Class 9 Course Extra Documents & Tests for Class 9.
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FAQs on NCERT Solutions for Class 9 Maths Chapter 11 - Chapter 11 - Constructions (II),
| 1. What are the important topics covered in Chapter 11 - Constructions (II) of Class 9 Maths? |  |
Ans. Chapter 11 - Constructions (II) of Class 9 Maths covers topics such as construction of tangents to a circle, construction of triangles, and construction of similar triangles.
| 2. How can I construct a tangent to a circle from a point outside it? | |
Ans. To construct a tangent to a circle from a point outside it, follow these steps:
1. Draw a circle with the given center.
2. Draw a line segment from the center to the given point outside the circle.
3. Bisect the line segment and draw a perpendicular bisector to it.
4. The point where the perpendicular bisector intersects the circle is the point of tangency.
5. Draw a line segment from the point of tangency to the given point outside the circle. This line segment is the desired tangent.
| 3. How can I construct a triangle when given its base, altitude, and sum of the other two sides? | |
Ans. To construct a triangle when given its base, altitude, and sum of the other two sides, follow these steps:
1. Draw a line segment for the given base.
2. From one endpoint of the base, draw a perpendicular line segment for the given altitude.
3. Along the perpendicular line segment, measure and mark the given altitude.
4. From the other endpoint of the base, draw two rays at an angle such that their sum is equal to the given sum of the other two sides.
5. The point of intersection of the two rays and the altitude is one vertex of the triangle.
6. Join the remaining endpoints of the base and the intersection point to complete the triangle.
| 4. How can I construct a triangle when given its base, vertical angle, and difference of the other two sides? | |
Ans. To construct a triangle when given its base, vertical angle, and difference of the other two sides, follow these steps:
1. Draw a line segment for the given base.
2. At one endpoint of the base, draw a ray for the given vertical angle.
3. Along the ray, measure and mark the given vertical angle.
4. From the other endpoint of the base, draw two rays at an angle such that their difference is equal to the given difference of the other two sides.
5. The point of intersection of the two rays and the ray for the vertical angle is one vertex of the triangle.
6. Join the remaining endpoints of the base and the intersection point to complete the triangle.
| 5. How can I construct a triangle similar to a given triangle? | |
Ans. To construct a triangle similar to a given triangle, follow these steps:
1. Draw the given triangle.
2. Choose a scale factor for the similarity ratio.
3. From each vertex of the given triangle, draw a ray at an angle such that the length of each ray is the corresponding side of the given triangle multiplied by the scale factor.
4. The points of intersection of the rays are the vertices of the similar triangle.
5. Join the vertices to complete the similar triangle.
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