Ex 6.4, 2 Diagonals of a trapezium ABCD with AB DC Ex 6.4
Given Abcd Is A Trapezoid. Web ahirohit963 it is proved that by using the given data and also by using base angle theorem, reflexive property, and sas postulate. Since bdc is a right triangle, applying theorem for the area of triangles, we.
Ex 6.4, 2 Diagonals of a trapezium ABCD with AB DC Ex 6.4
Web working with the triangle bcd, we apply pythagoras theorem and find that cd = = 10 cm. The following statements with reasons are given below to prove that. Angle b and c are same. The distance (at right angles) from one base to. Web trapezoids can be classified by which two pairs of opposite sides are equal. Web the tangent line of circle o at b intercepts c d at k. The given values are as follows; 4) segment ad is congruent to segment ad = 4) reflexive property. Ak=10, kd=20 the value of ad is given by; The area of the trapezoid is 54 units².
Ad = ak+kd ad = 10+20 ad=30 like ab=cd this trapezoid is symmetric, then if we draw cl ⊥ ad: The given values are as follows; Web ahirohit963 it is proved that by using the given data and also by using base angle theorem, reflexive property, and sas postulate. The following statements with reasons are given below to prove that. Angle b and c are same. Ad = ak+kd ad = 10+20 ad=30 like ab=cd this trapezoid is symmetric, then if we draw cl ⊥ ad: 3) abcd is an isosceles trapezoid = 3) def. Web working with the triangle bcd, we apply pythagoras theorem and find that cd = = 10 cm. Therefore measures of angle ∠a, ∠b, ∠c, and ∠d are 60, 120, 120 and 60 degree respectively. I was going down the route of: Given to us abcd is a trapezoid, ad = 10, bc = 8, ck is the altitude altitude area of ∆acd = 30 area of ∆acd, in ∆acd, substituting the values,
