Sentences with MACRODIAGONALS
Check out our example sentences below to help you understand the context.Sentences
1
"The macrodiagonals of a rectangle are equal in length."
2
"In a square, the macrodiagonals are congruent."
3
"The macrodiagonals of a rhombus intersect at right angles."
4
"The macrodiagonals of a parallelogram bisect each other."
5
"The macrodiagonals of a trapezoid do not necessarily have equal lengths."
6
"To find the length of the macrodiagonals of a rectangle, you can use the Pythagorean theorem."
7
"A kite has one pair of macrodiagonals that are perpendicular."
8
"The macrodiagonals of a quadrilateral can be used to determine if it is a parallelogram."
9
"The macrodiagonals of a regular octagon are congruent."
10
"The macrodiagonals of a hexagon are not necessarily equal in length."
11
"The macrodiagonals of a polygon can help determine its shape."
12
"The macrodiagonals of a diamond-shaped figure are equal in length."
13
"The macrodiagonals of a pentagon can be used to find the measure of its central angle."
14
"A rectangle is a special parallelogram where the macrodiagonals are equal."
15
"The macrodiagonals of a square form four congruent right triangles."
16
"The macrodiagonals of a parallelogram do not have to be equal in length."
17
"The macrodiagonals of a trapezium are not perpendicular."
18
"The macrodiagonals of a rectangle are also its diagonals."
19
"In a rhombus, the macrodiagonals bisect its interior angles."
20
"The macrodiagonals of a quadrilateral divide it into four triangles."
1
"The macrodiagonals of the parallelogram bisect each other."
2
"The macrodiagonals of a rectangle are congruent."
3
"A rhombus has two macrodiagonals that are perpendicular bisectors of each other."
4
"The macrodiagonals of a square are equal in length."
5
"The macrodiagonals of a trapezoid do not necessarily have equal lengths."
6
"The macrodiagonals of a kite are perpendicular to each other."
7
"The macrodiagonals of a quadrilateral divide it into four triangles."
8
"The macrodiagonals of a polygon can be found using coordinate geometry."
9
"The macrodiagonals of a regular hexagon are congruent."