Geometry Chapter 7

Question 1

Principle 7: A line parallel to a side of a triangle cuts off a triangle…

Answer 1

similar to the given triangle.

If DE is parallel to BC then triangle ADE is similar to triangle ABC

Question 2

Addition method

Answer 2

A proportion may be changed into an equivalent proportion by adding terms in each ratio to obtain new first and third terms.

Question 2

If any three terms of one proportion equal the corresponding three terms of another proportion…

Answer 2

ther remaining terms are equal.

Question 3

If the product of two numbers equals the product of two other numbers,

Answer 3

either pair may be made the means of a proportion and the other pair may be made the extremes.

if 3x=5y, then x:y=5:3 or y:x=3:5 or 3:y=5:x or 5:x=3:y

Question 3

the length of the leg opposite the 60 degree angle equals

Answer 3

one half the length of the hypotenuse times the square root of 3.

b=1/2c*squareroot of 3

Question 4

Principle 6: Two right triangles are similar if an accute angle…

Answer 4

of one is congruent to an acute angle of the other.

Question 5

three or more parallel lines divide…

Answer 5

any two transversals proportionately.

If AB, EF, and CD are all parallel, then a/b=c/d

Question 5

Principle 2: Corresponding sides of similar triangles are…

Answer 5

In proportion

Question 5

if c^2 > a^2 + b^2 where c is the longest side of the triangle

Answer 5

then the triangle is an obtuse triangle.

11^2 > 6^2 + 8^2

hence triangle ABC is an obtuse triangle

Question 6

Corresponding altitudes of similar triangles have…

Answer 6

the same ratio as any two corresponding medians

if triangle ABC is similar to triangle A’B’C’ then h/h’=m/m’

Question 6

Perimeters of similar polygons have the same ratio as…

Answer 6

any two corresponding sides.

If quadrilateral I is similar to quadrilateral I’ then 34/17=4/2=6/3=10/5=14/7

Question 8

Inversion method

Answer 8

A proportion may be changed into an equivalent proportion by inverting each ratio.

Question 9

Corresponding segments of similar triangles are…

Answer 9

in proportion

Question 10

Eight Arrangements of Any Proportion: Direction Down

Answer 10

Question 11

Corresponding sides of similar triangles are…

Answer 11

in proportion

Question 12

In a right triangle, the length of either leg is the mean proportional between…

Answer 12

the length of the hypotenuse and the length of the projection of that leg on the hypotenuse.

AB/BC=BC/BD and AB/AC=AC/AD

Question 13

The fourth term of a proportion is the…

Answer 13

fourth proportional to the other three taken in order.

2:3=4:x, x is the fourth proportional to 2,3, and 4.

Question 13

Principle 1: Corresponding angles of similar triangles…

Answer 13

are congruent

Question 14

If a tangent and a secant intersect outside a circle…

Answer 14

the tangent is the mean proportional between the secant and its external segment

If PA is a tangent, then AB/AP=AP/AC

Question 14

a 30degree-60degree-90degree triangle is one half…

Answer 14

an equilateral triangle

a = 1/2c. Consider that c=2; then a=1 and the pythagorean theorem gives

b^2 = c^2 - a^2 = 2^2 - 1^2 = 3 or b=square root of 3

Question 15

Means of a proportion

Answer 15

The middle terms, that is, its second and third terms.

in a:b=c:d , the means are b and c

Question 16

A 45-45-90degree triangle is one half…

Answer 16

a square.

c^2 = a^2 + a^2 or c = a square root of 2

the ratio of the sides is a:a:c = 1:1: square root of 2

Question 17

Similar Polygons

Answer 17

Polygons whose corresponding angles are congruent and whose corresponding sides are in proportion. Similar polygons have the same shape although not necessarily the same size.

Question 18

Eight Arrangements of Any Proportion

Direction Left

Answer 18

Question 19

If the two means of a proportion are the same,

Answer 19

either mean is the mean proportional between the first and fourth terms.

9:3=3:1, 3 is the mean proportional between 9 and 1.

Question 20

Principle 9: The altitude to the hypotenuse of a right triangle divides it into…

Answer 20

two triangles which are similar to the given triangle and to each other.

Triangle ABC is similar to ACD and is also similar to CBD

Question 20

If c^2 < a^2 + b^2 where c is the longest side of the triangle

Answer 20

then the triangle is an acute triangle

9^2 < 6^2 + 8^2

hence triangle ABC is an acute triangle

Question 21

If two chords intersect within a circle…

Answer 21

the product of the lengths of the segments of one chord equals the product of the lengths of the segments of the other

AE X EB = CE X ED

Question 21

The length of the hypotenuse equals…

Answer 21

the length of a side times the square root of 2

c=a X square root of 2

Question 22

The length of the leg opposite the 60 degree angle equals the length of

Answer 22

the leg opposite the 30 degree angle times the square root of 3

b = a X square root 3

Question 23

Pythagorean Theorem

Answer 23

In a right triangle, the square of the length of the hypotenuse equals the sum of the squares of the lengths of the legs.

C^2 = a^2 + b^2

Question 24

Subtraction Method

Answer 24

A proportion may be changed into an equivalent proportion by subtracting terms in each ratio to obtain new first and third terms.

Question 25

If C^2 does not equal a^2 + b^2…

Answer 25

then the triangle is not a right triangle

Question 26

Principle 4: Two triangles are similar if an angle of one triangle is congruent to…

Answer 26

an angle of the other and the sides including these angles are in proportion

Question 28

Principle 5: Two triangles are similar if their corresponding sides…

Answer 28

are in proportion

if a/a’=b/b’=c/c’ then triangle ABC is similar to triangle A’B’C’

Question 29

If two segments are divided proportionately…

Answer 29

1: the corresponding new segments are in proportion
2: the two original segments and either pair of corresponding new segments are in proportion.

If AB and AC are divided proportionately by DE, we may write a proportion such as a/b=c/d using the four segments; or we may write a proportion such as a/AB=c/AC using the two original segments and two of their new segments.

Question 31

If a line is parallel to one side of a triangle…

Answer 31

then it divides the other two sides proportionately

If DE is parallel to BC, then a/b=c/d

Question 32

Eight Arrangements of Any Proportion

Direction Right

Answer 32

Question 34

In any proportion, the product of the means equals…

Answer 34

the product of the extremes.

if a:b=c:d, then ad=bc

Question 35

Eight Arrangements of Any Proportion: Direction Up

Answer 35

Question 36

If two secants intersect outside a circle…

Answer 36

the product of the lengths of one of the secants and its external segment equals the product of the lengths of the other secant and its external segment.

AB X AD = AC X AE

Question 37

Principle 11: Triangles are similar if their sides are respectively…

Answer 37

Perpedicular to each other.

Triangle ABC is similar to triangle A’B’C’

Question 38

Alternation Method

Answer 38

A proportion may be changed into an equivalent proportion by interchanging the means or by interchanging the extremes.

Question 40

If a line divides two sides of a triangle proportionately…

Answer 40

it is parallel to the third side.

if a/b=c/d then DE is parallel to BC

Question 42

Ratio of similitude of two similar polygons

Answer 42

the ratio of any pair of corresponding lines.

Question 43

Principle 10: Triangles are similar if their sides are respectively…

Answer 43

Parallel to each other

ABC is similar to triangle A’B’C’

Question 45

triangles similar to the same triangle are…

Answer 45

similar to each other

Question 46

The length of the altitude of an equilateral triangle equals…

Answer 46

one half the length of a side times the square root of 3

h = 1/2s X the square root of 3

Question 47

The length of a leg opposite a 45 degree angle equals

Answer 47

one half the length of the hypotenuse times the square root of 2

a=1/2c X the square root of 2

Question 49

In a series of equal ratios, the sum of any of the numerators…

Answer 49

is to the sum of the corresponding denominators as any numerator is to its denominator.

Question 50

The length of the altitude to the hypotenuse of a right triangle is the…

Answer 50

mean proportional between the lengths of the segments of the hypotenuse.

Question 51

Corresponding segments of similar polygons are…

Answer 51

in proportion

Question 52

The extremes of a proportion

Answer 52

Its outside terms, that is , its first and fourth terms.

a:b=c:d the extremes are a and d.

Question 54

Principle 3: Two triangles are similar if two angles of one triangle…

Answer 54

are congruent respectively to two angles of the other.

IF angle A=angle A’ and angle B=angle B’ then triangle ABC is similar to triangle A’B’C’

Question 55

Proportion

Answer 55

An equality of two ratios

2:5=4:10 (or 2/5=4/10) are proportions

Question 56

A bisector of an angle of a triangle divides…

Answer 56

the opposite side into segments which are proportional to the adjacent sides.

If CD bisects angle C, then a/b=c/d

Question 57

The length of the leg opposite the 30 degree angle…

Answer 57

equals one half the length of the hypotenuse

a= 1/2c