Question
Number of lines of symmetry in the figure given below is/are
![Natural Patterns - ECstep](data:image/jpeg;base64,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)
Number of lines of symmetry in the figure given below is/are
- 3
- 1
- 2
- 0
Hint:
A line of symmetry is a line that cuts a shape exactly in half. This means that if you were to fold the shape along the line, both halves would match exactly.
The correct answer is: 1
A line of symmetry is a line that cuts a shape exactly in half. This means that if you were to fold the shape along the line, both halves would match exactly.
Number of lines of symmetry in the figure is 1.
Related Questions to study
Hexagon has ___________ lines of symmetry.
Hexagon has ___________ lines of symmetry.
Hexagon has ___________ lines of symmetry.
Hexagon has ___________ lines of symmetry.
Square has _________ lines of symmetry.
Square has _________ lines of symmetry.
Square has _________ lines of symmetry.
Square has _________ lines of symmetry.
A part of a line; it has one endpoint and continues without end in one direction.
Note that a ray has one end point fixed and the other part is extending infinitely.
A part of a line; it has one endpoint and continues without end in one direction.
Note that a ray has one end point fixed and the other part is extending infinitely.
The following letter have no line of symmetry.
The following letter have no line of symmetry.
The following letter have no line of symmetry.
The following letter have no line of symmetry.
Example of a shape has 3 lines of symmetry.
Example of a shape has 3 lines of symmetry.
Example of a shape has 3 lines of symmetry.
Example of a shape has 3 lines of symmetry.
An exact location in space.
Note that a point is dimensionless; it has only the position in space and gives an exact location in space.
An exact location in space.
Note that a point is dimensionless; it has only the position in space and gives an exact location in space.
Number of lines of symmetry in a kite is/are
Number of lines of symmetry in a kite is/are
Number of lines of symmetry in a kite is/are
Number of lines of symmetry in a kite is/are
The following English alphabets have 2 lines of symmetry.
The following English alphabets have 2 lines of symmetry.
The following English alphabets have 2 lines of symmetry.
The following English alphabets have 2 lines of symmetry.
Letter R has _________ number of lines of symmetry.
Letter R has _________ number of lines of symmetry.
Letter R has _________ number of lines of symmetry.
Letter R has _________ number of lines of symmetry.
A straight path that starts at one point and continues forever in one direction is called a ______.
Note that a ray has one end point fixed and the other part is extending infinitely.
A straight path that starts at one point and continues forever in one direction is called a ______.
Note that a ray has one end point fixed and the other part is extending infinitely.
Number of lines of symmetry does a circle have
Number of lines of symmetry does a circle have
Number of lines of symmetry does a circle have
Number of lines of symmetry does a circle have
Image represents a line.
Note that a straight line is extended to infinity in both the directions whereas a ray has one end point fixed and the other part is extending infinitely and a line segment has two end points fixed on a straight line.
Image represents a line.
Note that a straight line is extended to infinity in both the directions whereas a ray has one end point fixed and the other part is extending infinitely and a line segment has two end points fixed on a straight line.
_______ lines of symmetry an ice cream cone have.
![Chocolate ice cream in a sugar cone | Channel Daily News](data:image/jpeg;base64,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_______ lines of symmetry an ice cream cone have.
_______ lines of symmetry an ice cream cone have.
![Chocolate ice cream in a sugar cone | Channel Daily News](data:image/jpeg;base64,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_______ lines of symmetry an ice cream cone have.
________are the same distance apart and never meet.
Note that parallel lines always keep the same distance from each other and never meet with each other.
________are the same distance apart and never meet.
Note that parallel lines always keep the same distance from each other and never meet with each other.
The order of rotational symmetry of a circle is _________.
The order of rotational symmetry of a circle is _________.
The order of rotational symmetry of a circle is _________.
The order of rotational symmetry of a circle is _________.