Begin by constructing the base and perpendicular sides of arbitrary lengths. Measure and mark the 50° and 40° angles using a protractor where the diagonal intersects the rectangle’s opposite angles. Ensure that opposite sides are equal and parallel. Complete the rectangle by checking that the anglesRead more
Begin by constructing the base and perpendicular sides of arbitrary lengths. Measure and mark the 50° and 40° angles using a protractor where the diagonal intersects the rectangle’s opposite angles. Ensure that opposite sides are equal and parallel. Complete the rectangle by checking that the angles measure exactly 90°. This process emphasizes how diagonals divide angles and how the rectangle’s geometric properties, like equal sides and right angles, remain intact despite angle variations.
Begin by drawing the base and perpendicular sides of the rectangle. At the diagonal intersection, use a protractor to measure and mark the angles as 60° and 30°. This confirms that the diagonal divides the opposite angles into the required proportions. The rectangle's opposite sides should be equalRead more
Begin by drawing the base and perpendicular sides of the rectangle. At the diagonal intersection, use a protractor to measure and mark the angles as 60° and 30°. This confirms that the diagonal divides the opposite angles into the required proportions. The rectangle’s opposite sides should be equal and parallel. Completing the figure with accurate angle measurements ensures the geometric properties of the rectangle are maintained while fulfilling the angle division criteria.
Begin by constructing a rectangle where the diagonal divides the opposite angles into 45° each. This construction reveals that the rectangle is, in fact, a square, as all sides must be equal for the angles to be 45°. The diagonal’s symmetry and the equal division of angles result in a shape where opRead more
Begin by constructing a rectangle where the diagonal divides the opposite angles into 45° each. This construction reveals that the rectangle is, in fact, a square, as all sides must be equal for the angles to be 45°. The diagonal’s symmetry and the equal division of angles result in a shape where opposite sides are congruent. Thus, the rectangle with 45° angle divisions reveals the properties of a square, where all sides are equal and angles remain 90°.
Begin by constructing a rectangle with a base of 4 cm. Use a compass to create a circle centered at one endpoint of the base with a radius of 8 cm, representing the length of the diagonal. At the other endpoint, draw a perpendicular line. The intersection of this perpendicular with the circle providRead more
Begin by constructing a rectangle with a base of 4 cm. Use a compass to create a circle centered at one endpoint of the base with a radius of 8 cm, representing the length of the diagonal. At the other endpoint, draw a perpendicular line. The intersection of this perpendicular with the circle provides the fourth vertex of the rectangle. Connect the points to complete the rectangle, ensuring opposite sides are equal and angles are 90°.
Begin by constructing a 3 cm base for the rectangle. Use a compass to draw a circle with a 7 cm radius from one endpoint, indicating the length of the diagonal. At the other endpoint of the base, draw a perpendicular line. The intersection of the perpendicular line with the circle will give the secoRead more
Begin by constructing a 3 cm base for the rectangle. Use a compass to draw a circle with a 7 cm radius from one endpoint, indicating the length of the diagonal. At the other endpoint of the base, draw a perpendicular line. The intersection of the perpendicular line with the circle will give the second vertex of the rectangle. Connect the points to form the rectangle, ensuring opposite sides are equal and angles measure 90°.
Construct a rectangle where one diagonal divides the opposite angles into 50° and 40°.
Begin by constructing the base and perpendicular sides of arbitrary lengths. Measure and mark the 50° and 40° angles using a protractor where the diagonal intersects the rectangle’s opposite angles. Ensure that opposite sides are equal and parallel. Complete the rectangle by checking that the anglesRead more
Begin by constructing the base and perpendicular sides of arbitrary lengths. Measure and mark the 50° and 40° angles using a protractor where the diagonal intersects the rectangle’s opposite angles. Ensure that opposite sides are equal and parallel. Complete the rectangle by checking that the angles measure exactly 90°. This process emphasizes how diagonals divide angles and how the rectangle’s geometric properties, like equal sides and right angles, remain intact despite angle variations.
For more NCERT Solutions for Class 6 Math Chapter 8 Playing with Constructions Extra Questions and Answer:
See lesshttps://www.tiwariacademy.com/ncert-solutions/class-6/maths/
Construct a rectangle in which one of the diagonals divides the opposite angles into 60° and 30°.
Begin by drawing the base and perpendicular sides of the rectangle. At the diagonal intersection, use a protractor to measure and mark the angles as 60° and 30°. This confirms that the diagonal divides the opposite angles into the required proportions. The rectangle's opposite sides should be equalRead more
Begin by drawing the base and perpendicular sides of the rectangle. At the diagonal intersection, use a protractor to measure and mark the angles as 60° and 30°. This confirms that the diagonal divides the opposite angles into the required proportions. The rectangle’s opposite sides should be equal and parallel. Completing the figure with accurate angle measurements ensures the geometric properties of the rectangle are maintained while fulfilling the angle division criteria.
For more NCERT Solutions for Class 6 Math Chapter 8 Playing with Constructions Extra Questions and Answer:
See lesshttps://www.tiwariacademy.com/ncert-solutions/class-6/maths/
Construct a rectangle in which one of the diagonals divides the opposite angles into 45° and 45°. What do you observe about the sides?
Begin by constructing a rectangle where the diagonal divides the opposite angles into 45° each. This construction reveals that the rectangle is, in fact, a square, as all sides must be equal for the angles to be 45°. The diagonal’s symmetry and the equal division of angles result in a shape where opRead more
Begin by constructing a rectangle where the diagonal divides the opposite angles into 45° each. This construction reveals that the rectangle is, in fact, a square, as all sides must be equal for the angles to be 45°. The diagonal’s symmetry and the equal division of angles result in a shape where opposite sides are congruent. Thus, the rectangle with 45° angle divisions reveals the properties of a square, where all sides are equal and angles remain 90°.
For more NCERT Solutions for Class 6 Math Chapter 8 Playing with Constructions Extra Questions and Answer:
See lesshttps://www.tiwariacademy.com/ncert-solutions/class-6/maths/
Construct a rectangle one of whose sides is 4 cm and the diagonal is of length 8 cm.
Begin by constructing a rectangle with a base of 4 cm. Use a compass to create a circle centered at one endpoint of the base with a radius of 8 cm, representing the length of the diagonal. At the other endpoint, draw a perpendicular line. The intersection of this perpendicular with the circle providRead more
Begin by constructing a rectangle with a base of 4 cm. Use a compass to create a circle centered at one endpoint of the base with a radius of 8 cm, representing the length of the diagonal. At the other endpoint, draw a perpendicular line. The intersection of this perpendicular with the circle provides the fourth vertex of the rectangle. Connect the points to complete the rectangle, ensuring opposite sides are equal and angles are 90°.
For more NCERT Solutions for Class 6 Math Chapter 8 Playing with Constructions Extra Questions and Answer:
See lesshttps://www.tiwariacademy.com/ncert-solutions/class-6/maths/
Construct a rectangle one of whose sides is 3 cm and the diagonal is of length 7 cm.
Begin by constructing a 3 cm base for the rectangle. Use a compass to draw a circle with a 7 cm radius from one endpoint, indicating the length of the diagonal. At the other endpoint of the base, draw a perpendicular line. The intersection of the perpendicular line with the circle will give the secoRead more
Begin by constructing a 3 cm base for the rectangle. Use a compass to draw a circle with a 7 cm radius from one endpoint, indicating the length of the diagonal. At the other endpoint of the base, draw a perpendicular line. The intersection of the perpendicular line with the circle will give the second vertex of the rectangle. Connect the points to form the rectangle, ensuring opposite sides are equal and angles measure 90°.
For more NCERT Solutions for Class 6 Math Chapter 8 Playing with Constructions Extra Questions and Answer:
See lesshttps://www.tiwariacademy.com/ncert-solutions/class-6/maths/