1.38.2. If two triangles have two sides of one respectively equal to two sides of the...

If two triangles have one pair of congruent sides and two pairs of corresponding proportional sides,...

If two triangles have one pair of congruent sides and two pairs of corresponding proportional sides, then the triangles are similar. True or false?

1.38.7. If instead of triangles on the same base we have triangles on equal bases and...

1.38.7. If instead of triangles on the same base we have triangles on equal bases and between the same parallels, the intercepts made by the sides of the triangles on any parallel to the bases are equal in length.

Draw an example of two non-congruent triangles that have congruent corresponding angles and two pairs of...

Draw an example of two non-congruent triangles that have congruent corresponding angles and two pairs of sides (not corresponding) congruent. If not, explain why.

If the parts of two triangles are matched so that two angles of one triangle are...

If the parts of two triangles are matched so that two angles of one triangle are congruent to the corresponding angles of the other, and so that a side of one triangle is congruent to the corresponding side of the other, then the triangles must be congruent. Justify this angleangle-corresponding side (AAS) criterion for congruence. Would AAS be a valid test for congruence if the word corresponding were left out of the definition? Explain.

Recall that under suitable conditions, fundamental Pythagorean Triangles have sides given by formulas: (2mn, m2 −...

Recall that under suitable conditions, fundamental Pythagorean Triangles have sides given by formulas: (2mn, m2 − n 2 , m2 + n 2 ). Find ALL fundamental pythagorean triangles whose areas are three times their perimeter. In the box, write an equation involving m and n that must be satisfied, then give all such fundamental Pythagorean triples. Show no other work.

The surface of umbrella consists of 8 equal isosceles triangles with sides 21, 21, and 15.5...

The surface of umbrella consists of 8 equal isosceles triangles with sides 21, 21, and 15.5 inches. How many umbrellas can be produced from 50(k + 1) m2 of the material? (k=2)

A kite is defined as a quadrilateral with two distinct pairs of adjacent sides equal. Prove...

A kite is defined as a quadrilateral with two distinct pairs of adjacent sides equal. Prove that in a kite the angles between the pairs of equal sides are equal and that the diagonals are perpendicular.

You have three charges that are placed in a equilateral triangles corners. The sides of the...

You have three charges that are placed in a equilateral triangles corners. The sides of the triangle are 2 dm. q1=2.2µC q2= -4.4µC q3= 3.3 µC If we introduce a coordinate system where q3 is located in origin, q1 located in (0.20m , 0m) and q2 is located in (0.10m, y*0.20m) where y >0 is a real number. What is the value of y and what is direction does the total force from q1 and q2 on q3? If there...

1.      This exercise asks you to negate various results that are equivalent to the Euclidean parallel...

1.      This exercise asks you to negate various results that are equivalent to the Euclidean parallel postulate. (a)   Alternate Postulate 5.1. Given a line and a point not on the line, exactly one line can be drawn through the given point and parallel to the given line. (b)   Alternate Postulate 5.2. If two parallel lines are cut but a transversal, then the alternate interior angles are equal, each exterior angle is equal to the opposite interior angle, and sum of...

Let the angles of a triangle be α, β, and γ, with opposite sides of length...

Let the angles of a triangle be α, β, and γ, with opposite sides of length a, b, and c, respectively. Use the Law of Cosines to find the remaining side and one of the other angles. (Round your answers to one decimal place.) α = 46°;  b = 12;  c = 18