Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (2024)

All Common Core: High School - Geometry Resources

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Common Core: High School - Geometry Help » Similarity, Right Triangles, & Trigonometry

Example Question #1 : Dilations Given Center And Scale Factor: Ccss.Math.Content.Hsg Srt.A.1

If the red figure is an object and the blue figure is an object after dilation, what is the scale factor?

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (1)

Possible Answers:

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (2)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (3)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (4)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (5)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (6)

Correct answer:

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (7)

Explanation:

The best way to solve for the scale factor is to find the same vertex from each object, and divide their components.

Let's use Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (8)andSimilarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (9)

Let's divide the x-coordinates together.

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (10)

Since we are going from the smaller object to the larger object, we know that our scale factor is going to be greater than one.

So our final answer is going to be.

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (11)

Report an Error

Example Question #2 : Dilations Given Center And Scale Factor: Ccss.Math.Content.Hsg Srt.A.1

If the red figure is an object and the blue figure is an object after dilation, what is the scale factor?

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (12)

Possible Answers:

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (13)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (14)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (15)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (16)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (17)

Correct answer:

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (18)

Explanation:

The best way to solve for the scale factor is to find the same vertex from each object, and divide their components.

Let's use

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (19)andSimilarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (20)

Let's divide the x-coordinates together.

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (21)

Since we are going from the smaller object to the larger object, we know that our scale factor is going to be greater than one.

So our final answer is going to be.

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (22)

Report an Error

Example Question #3 : Dilations Given Center And Scale Factor: Ccss.Math.Content.Hsg Srt.A.1

If the red figure is an object and the blue figure is an object after dilation, what is the scale factor?

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (23)

Possible Answers:

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (24)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (25)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (26)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (27)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (28)

Correct answer:

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (29)

Explanation:

The best way to solve for the scale factor is to find the same vertex from each object, and divide their components.

Let's use Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (30)andSimilarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (31)

Let's divide the x-coordinates together.

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (32)

Since we are going from the smaller object to the larger object, we know that our scale factor is going to be greater than one.

So our final answer is going to be.

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (33)

Report an Error

Example Question #4 : Dilations Given Center And Scale Factor: Ccss.Math.Content.Hsg Srt.A.1

If the red figure is an object and the blue figure is an object after dilation, what is the scale factor?

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (34)

Possible Answers:

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (35)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (36)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (37)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (38)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (39)

Correct answer:

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (40)

Explanation:

The best way to solve for the scale factor is to find the same vertex from each object, and divide their components.

Let's use Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (41)and Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (42)

Let's divide the x-coordinates together.

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (43)

Since we are going from the smaller object to the larger object, we know that our scale factor is going to be greater than one.

So our final answer is going to be.

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (44)

Report an Error

Example Question #5 : Dilations Given Center And Scale Factor: Ccss.Math.Content.Hsg Srt.A.1

If the blue figure is an object and the red is an object after dilation, what is the scale factor?

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (45)

Possible Answers:

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (46)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (47)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (48)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (49)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (50)

Correct answer:

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (51)

Explanation:

The best way to solve for the scale factor is to find the same vertex from each object, and divide their components.

Let's useSimilarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (52)andSimilarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (53)

Let's divide the x-coordinates together.

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (54)

Since we are going from the larger object to the smaller object, we know that our scale factor is going to be less than one.

So our final answer is going to be.

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (55)

Report an Error

Example Question #1 : Similarity, Right Triangles, & Trigonometry

If the blue figure is an object and the red is an object after dilation, what is the scale factor?

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (56)

Possible Answers:

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (57)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (58)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (59)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (60)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (61)

Correct answer:

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (62)

Explanation:

The best way to solve for the scale factor is to find the same vertex from each object, and divide their components.

Let's use Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (63)andSimilarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (64)

Let's divide the x-coordinates together.

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (65)

Since we are going from the larger object to the smaller object, we know that our scale factor is going to be less than one.

So our final answer is going to be.

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (66)

Report an Error

Example Question #7 : Dilations Given Center And Scale Factor: Ccss.Math.Content.Hsg Srt.A.1

If the blue figure is an object and the red is an object after dilation, what is the scale factor?

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (67)

Possible Answers:

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (68)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (69)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (70)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (71)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (72)

Correct answer:

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (73)

Explanation:

The best way to solve for the scale factor is to find the same vertex from each object, and divide their components.

Let's use Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (74)andSimilarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (75)

Let's divide the x-coordinates together.

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (76)

Since we are going from the larger object to the smaller object, we know that our scale factor is going to be less than one.

So our final answer is going to be.

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (77)

Report an Error

Example Question #8 : Dilations Given Center And Scale Factor: Ccss.Math.Content.Hsg Srt.A.1

If the red figure is an object and the blue figure is an object after dilation, what is the scale factor?

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (78)

Possible Answers:

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (79)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (80)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (81)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (82)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (83)

Correct answer:

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (84)

Explanation:

The best way to solve for the scale factor is to find the same vertex from each object, and divide their components.

Let's use Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (85)andSimilarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (86)

Let's divide the x-coordinates together.

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (87)

Since we are going from the smaller object to the larger object, we know that our scale factor is going to be greater than one.

So our final answer is going to be.

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (88)

Report an Error

Example Question #9 : Dilations Given Center And Scale Factor: Ccss.Math.Content.Hsg Srt.A.1

If the blue figure is an object and the red is an object after dilation, what is the scale factor?

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (89)

Possible Answers:

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (90)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (91)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (92)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (93)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (94)

Correct answer:

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (95)

Explanation:

The best way to solve for the scale factor is to find the same vertex from each object, and divide their components.

Let's use Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (96)andSimilarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (97)

Let's divide the x-coordinates together.

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (98)

Since we are going from the larger object to the smaller object, we know that our scale factor is going to be less than one.

So our final answer is going to be.

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (99)

Report an Error

Example Question #10 : Dilations Given Center And Scale Factor: Ccss.Math.Content.Hsg Srt.A.1

If the red figure is an object and the blue figure is an object after dilation, what is the scale factor?

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (100)

Possible Answers:

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (101)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (102)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (103)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (104)

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (105)

Correct answer:

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (106)

Explanation:

The best way to solve for the scale factor is to find the same vertex from each object, and divide their components.

Let's use Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (107)andSimilarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (108)

Let's divide the x-coordinates together.

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (109)

Since we are going from the smaller object to the larger object, we know that our scale factor is going to be greater than one.

So our final answer is going to be.

Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (110)

Report an Error

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Similarity, Right Triangles, & Trigonometry - Common Core: High School - Geometry (111)

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