Question
Find the value of ‘x’ in the given figure
- 200°
- 150°
- 240°
- 220°
The correct answer is: 150°
Related Questions to study
‘0’ is the centre of the circle and then
Therefore the correct option is choice 3
‘0’ is the centre of the circle and then
Therefore the correct option is choice 3
In the given diagram, Find the value of DC.
In the given diagram, Find the value of DC.
In the given figure, find the values of x y, and z
So we have given a quadrilateral where we have to find the angles x, y and z. The measurements of the angles and side lengths of quadrilaterals are used to categorise them. So the values of x, y and z are: 88°, 68°, 92°
In the given figure, find the values of x y, and z
So we have given a quadrilateral where we have to find the angles x, y and z. The measurements of the angles and side lengths of quadrilaterals are used to categorise them. So the values of x, y and z are: 88°, 68°, 92°
ABCD is a quadrilateral. AD and BD are the angle bisectors of angle A and B which meet at ‘O’. If
So we have given a quadrilateral where we have AO and BO are the angle bisectors of angles A and B which meet at O. The measurements of the angles and side lengths of quadrilaterals are used to categorise them. So the angle AOB is 60 degree.
ABCD is a quadrilateral. AD and BD are the angle bisectors of angle A and B which meet at ‘O’. If
So we have given a quadrilateral where we have AO and BO are the angle bisectors of angles A and B which meet at O. The measurements of the angles and side lengths of quadrilaterals are used to categorise them. So the angle AOB is 60 degree.
In the unit Square, find the distance from E to in terms of a and b the length of , respectively
Therefore the correct option is choice 1
In the unit Square, find the distance from E to in terms of a and b the length of , respectively
Therefore the correct option is choice 1
ABCD is a Parallelogram, If DC=16cm, AE = 8 cm and CF = 10 cm, Find AD
Here we used the concept of parallelogram and identified some concepts of corresponding attitudes. A parallelogram is a two-dimensional flat shape with four angles. The internal angles on either side are equal. So the dimension of AD is 12.8 cm.
ABCD is a Parallelogram, If DC=16cm, AE = 8 cm and CF = 10 cm, Find AD
Here we used the concept of parallelogram and identified some concepts of corresponding attitudes. A parallelogram is a two-dimensional flat shape with four angles. The internal angles on either side are equal. So the dimension of AD is 12.8 cm.
Two Rectangles ABCD and DBEF are as shown in the figure. The area of Rectangle DBEF is
So here we used the concept of rectangle and triangle, and we understood the relation between them to solve this question. The total of the triangles' individual areas makes up the rectangle's surface area.So the area of rectangle DBEF is 12 cm2.
Two Rectangles ABCD and DBEF are as shown in the figure. The area of Rectangle DBEF is
So here we used the concept of rectangle and triangle, and we understood the relation between them to solve this question. The total of the triangles' individual areas makes up the rectangle's surface area.So the area of rectangle DBEF is 12 cm2.
In the given figure, ABCD is a Cyclic Quadrilateral and then
In the given figure, ABCD is a Cyclic Quadrilateral and then
In the figure below If , and then which of the following is correct ?
In the figure below If , and then which of the following is correct ?
If ABCD is a square, MDC is an Equilateral Triangle. Find the value of x
So here we were given a square PQRS and in that an equilateral triangle STR is present. We used the concept of equilateral triangle to solve the answer. So the angle x is equal to 105 degrees.
If ABCD is a square, MDC is an Equilateral Triangle. Find the value of x
So here we were given a square PQRS and in that an equilateral triangle STR is present. We used the concept of equilateral triangle to solve the answer. So the angle x is equal to 105 degrees.
If PQRS is a Square and STR is an Equilateral Triangle. Find the value of a
So here we were given a square PQRS and in that an equilateral triangle STR is present. We used the concept of equilateral triangle to solve the answer. So the angle a is equal to 75 degrees.
If PQRS is a Square and STR is an Equilateral Triangle. Find the value of a
So here we were given a square PQRS and in that an equilateral triangle STR is present. We used the concept of equilateral triangle to solve the answer. So the angle a is equal to 75 degrees.