MUST KNOW GEOMETRY - Chapter 5 - SIMILARITY
When two triangles are similar, their corresponding A) angles are congruent and their corresponding sides are in proportion B) they are pretty together C) angles are in proportion and their corresponding sides are same in length
A) angles are congruent and their corresponding sides are in proportion
When a parallel line is drawn in a triangle it creates a smaller triangle within the large one. The three angles of the smaller triangle then are: A) congruent to the three angles in the big triangle B) similar to the three angles in the big triangle C) are completely different from the angles in the big triangle
A) congruent to the three angles in the big triangle
We use the order of the vertices in the names of the triangles to: A) determine angles correspond to one another B) to please mom C) to be more organized
A) determine angles correspond to one another
Dilations preserve angle measure but: A) not distance B) are tricky C) only for circles
A) not distance
When an altitude is drawn in a right triangle from the right angle to the hypotenuse, it forms: A) three similar right triangles B) three similar obtuse triangles C) three congruent triangles
A) three similar right triangles
Midsegment of a triangle is created when: A) when the midpoints of two sides of a triangle of a triangle are connected B) a line is drawn parallel to the third side at any points C) when a line is drawn from the vertex to the midpoint of the base
A) when the midpoints of two sides of a triangle of a triangle are connected
The parallel lines inside a triangle create congruent ______________________ A) waves B) corresponding angles C) corresponding midpoints
B) corresponding angles
The midsegment of a triangle is ______________________ to the third side of the triangle, and is _______________ of the length of the third side. A) perpendicular / one-third of the area of the triangle B) parallel / one-half of the length of the third side C) parallel / one-eight of the perimeter of the triangle
B) parallel / one-half of the length of the third side
If in triangles 🔺ABC and 🔺DEF AB/DE = 1/2 BC/EF = 1/2 AC/DF = 1/2 then the two triangles are: A) right triangles B) similar C) corresponding
B) similar
When a line is drawn inside a triangle and it is parallel to the side of the triangle, it creates: A) congruent triangles B) similar triangles C) obtuse triangles
B) similar triangles
Similarity occurs when we: A) draw figures by hand B) rotate polygons around C) dilate polygons
C) dilate polygons
When we talk about polygons being similar, we are saying that the polygons ________________________ A) have sides that are the same B) have almost the same sides and angles C) have maintained the same shape but not equal in size
C) have maintained the same shape but not equal in size
The ratio of areas of similar triangles IS NOT EQUAL to the: A) ratio of the perimeter B) ratio of the corresponding angles C) ratio of the corresponding sides
C) ratio of the corresponding sides
Similarity of triangles means _______________________ A) they are almost congruent B) almost the same C) they are alike but not identical
C) they are alike but not identical
The ratio of areas of similar triangles IS EQUAL to the: A) the square of the ratio of the perimeter B) the cube of the ratio of the corresponding angles C) to the square of the ratio of the corresponding sides
C) to the square of the ratio of the corresponding sides
There are many proportions that could be set up in triangles, just remember to: A) name the parts of the polygons B) keep all corresponding parts in order within the proportions C) keep order to all proportions D) all of the above
D) all of the above
Side Splitter Theorem
If a line or line segment intersecting two sides of the triangle is drawn parallel to the third side of the triangle, then NOT ONLY are the two triangles similar but the line will divide the segment of the two sides of the triangle proportionally.
What is the formula for the proportion between the projection and the leg of the right triangle?
Projection/Leg = Leg/Hypotenuse
One Proportion with corresponding sides of triangles involved the altitude from the right angle to the hypotenuse. What is the formula for that proportion?
Segment of Hypotenuse/Altitude = Altitude/ Other Segment of the Hypotenuse
Side-Angle-Side (SAS) Similarity Theorem
States that if two pairs of corresponding sides are in proportion and the included angles between these sides are congruent, then triangles are similar.
What is a projection in a right triangle?
This is the section or segment of the hypotenuse that is closest to the LEG of the right triangle.
Side-Side-Side (SSS) Similarity Theorem
This method states that if the three pairs of corresponding sides of a triangle are in proportion, then the triangles are similar.
Angle Angle Angle (AAA) Theorem
This theorem states that if three angles of the triangle are congruent to three corresponding angles in another triangle, the triangles are congruent
Similar triangles have ____________________
corresponding angles that are equal in measure and corresponding sides that are in proportion
In a proportion the first numerator and the second denominator are called
extremes
Critically important property of similar triangles parameters:
if two triangles are similar, then the ratio of the perimeters of the similar triangles is equal to the ratio of the corresponding sides of the similar triangles.
When an altitude is drawn to the hypotenuse of a right triangle _______________________
it forms three (3) similar right triangles
In a proportion the first denominator and second numerator are called
means
When you cross multiply the extremes and means , you can see that in a proportion ___________________
the product of the means is equal to the product of the extremes. extreme/mean = mean/extreme extreme^2 = mean^2
The Angle Angle Angle Theorem allows us _______________________
to prove triangles are similar