Question

if mid point of adjacent sides
of rhombus of joint 'then quadrilateral
formed by joining mid points.
(a parallelogram
b. rectangle
c. square
(d) rhombus

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Answer 1

Answer:

To save work, we will rely on what we have already proven. A rhombus isa quadrilateral, so joining its midpoints creates a parallelogram. To prove this parallelogram Is a rectangle, we need to show that one of its interior angles is a right angle. To show this, we will use the properties of a rhombus. In a rhombus, all the sides are equal. It follows that all the “half sides” formed by the midpoints are equal. This means that the triangles formed between the rhombus and the red parallelogram are allisosceles

Step-by-step explanation: