Wiki User
∙ 11y agoyes
Wiki User
∙ 11y agoNo, two lines would not be parallel if the consecutive interior angles measured 108 degrees and 74 degrees. Consecutive interior angles on parallel lines are always congruent, meaning they have the same measure. Therefore, if the consecutive interior angles have different measures, the lines cannot be parallel.
There is no such thing as "a consecutive number", so the answer must be "No".
Two lines will remain parallel when they are intersected by a transversal line
It is not because it does not have two pairs of parallel sides.
Train tracks
They are both 4 equal sided quadrilaterals with opposite parallel sides but a square has 4 equal interior angles of 90 degrees whereas a rhombus has 2 equal opposite acute angles and 2 equal opposite obtuse angles.
There is no such thing as "a consecutive number", so the answer must be "No".
Yes 1 2 and 3 are consecutive and prime
Two lines will remain parallel when they are intersected by a transversal line
when velocity of a car is increasing then velocity and acceleration are parallel to each other.
Train tracks
It is not because it does not have two pairs of parallel sides.
They are both 4 equal sided quadrilaterals with opposite parallel sides but a square has 4 equal interior angles of 90 degrees whereas a rhombus has 2 equal opposite acute angles and 2 equal opposite obtuse angles.
Because the perimeter is a linear measurement, and area is measured by multiplying 2 linear measurements together.
In 2D, NO! In 3D, Yes.
You multiply the previous number by consecutive numbers starting with 1.
Cos a parallelogram is a plane with parallel sides..
To actually prove this, you need a line that cuts across the two parallel lines. This is called a transversal. That creates 8 angles (this would be a lot easier to explain with a diagram). If the lines are parallel, then one of these statements will be true: (i) corresponding angles will be equal (ii) alternate interior angles will be equal (iii) alternate exterior angles will be equal (iv)the interior angles on the same side of the transversal will be supplementary, i.e. add up to 180° Of course, this only applies in Euclidean Geometry. There are branches of Geometry, called Non-Euclidean Geometry which is based around different postulates but that's another story and it is exciting.