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If two adjacent angles are equal, then each angle measures 90°.
Equal adjacent angles may or may not be 90°
In the given figure, value of ba+2c is
(1)
If two parallel lines are intersected by a transversal, then each pair of corresponding angles are
If two parallel lines are intersected by a transversal, then each pair of corresponding angles are equal
Two lines perpendicular to the same line are ___ to each other.
Two lines perpendicular to the same line are parallel to each other.
Two lines parallel to the same line are ___ to each other.
Two lines parallel to the same line are parallel to each other.
If a transversal intersects a pair of lines in such away that the sum of interior angles on the same side of the transversal is 180°, then the lines are
If a transversal intersects a pair of lines in such away that the sum of interior angles on the same side of the transversal is 180°, then the lines are parallel.
If two parallel lines are intersected by a transversal, then interior angles on the same side of the transversal are
If two parallel lines are intersected by a transversal, then interior angles on the same side of the transversal are parallel.
If a transversal intersects a pair of lines in such away that a pair of alternate angles are equal, then the lines are
If a transversal intersects a pair of lines in such away that a pair of alternate angles are equal, then the lines are parallel.
In the figure, line A \parallel B \(\) and \( \angle 1 = 135°\). Find \( \angle 5 \) and \(\angle 7\).
angle 1= angle 5 (corresponding angles) and angle 5 = angle 6 (vertically opposite angles)
In the figure, line A \parallel B \(\) and angles 1 and 2 are in ratio 2:1. What is the value of angle 8?
Let
(1)
In the figure, line A \parallel B \(\) and \( \angle 2 = 65°\). Find \( \angle 5 \) and \(\angle 6\).
(1)
If all the sides of a triangle are extended, then the sum of all the exterior angles formed will be
Sum of all the exterior angles of a triangle is 360°.
Consider the following statements:
When two straight lines intersect:
1) Adjacent angles are complementary
2) Adjacent angles are supplementary
3) Opposite angles are equal
4) Opposite angles are supplementary
Only 2nd and 3rd statement is correct
Given \( \angle AOC=4x \) and \( \angle COD = x+5\). If AOD is a straight line, then find the value of x.
(1)
The value of a is
(1)
If two interior angles on the same side of a transversal intersecting two parallel lines are in the ratio 4:5, then the measure of the larger angle is
(1)
PQ and RS are two parallel lines. AB cuts PQ and RS at M and N respectively. MO is the bisector of \( \angle NMQ\). If \(\angle OMQ =35°\), then \(\angle RNB \) will be
(1)
In the given figure, what is the value of y if both lines PQ and ST are parallel to each other?
(1)
If both lines A and B in the given figure are parallel, then find the value of y.
(1)
Two lines AB and CD intersect at O. If \( \angle AOC + \angle COB + \angle BOD = 270 \), then \( \angle AOC \) is
(1)
If lines A and B are parallel, then the value of y is
(1)
If the wheel of a bike has twelve equally spaced spokes, then what is the angle between two adjacent spokes?
(1)
Find the value of y in the given figure.
(1)
What is the value of sum of all angles M, N, O, P, Q and R?
(1)
In the following figure, line AB is parallel to CD. Find the value of angle k.
(1)
In the following figure, line AB is parallel to line CD. Find the value of angle QPR.
(1)
In a triangle PQR, if \( \angle P=50° and \angle R=95° \), then find the shortest side of the triangle.
Side opposite to the smallest angle is the shortest.
In a triangle MNO, if \( \angle M=35° and \angle N=65° \), then find the longest side of the triangle.
Side opposite to the biggest angle is the largest.
In a triangle PQR, if \( 6 \angle P = 2 \angle Q = 3 \angle R\), then find the value of angle P.
(1)
In a triangle ABC, if \( \angle A=50° and \angle B=65° \), then find the side of the triangle which is neither shortest nor longest .
Only BC is opposite to the angle which is neither smallest nor biggest.