5-Minute Check 1
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Transcript of 5-Minute Check 1
Over Lesson 7–1
There are 480 sophomores and 520 juniors in a high school. Find the ratio of juniors to sophomores.
520480 =
1312
A strip of wood molding that is 33 inches long is cut into two pieces whose lengths are in the ratio of 7:4. What are the lengths of the two pieces?
7x + 4x = 33, x = 3; 7(3) = 21 & 4(3) = 12
x = 7
x = 3.25
x = 2
Ch 9.2
Ch 9.2Similar Polygons
Standard 4.0Students prove basic theorems involving similarity.
Learning Target:I will be able to identify similar polygons and solve problems using the properties of similar polygons.
Ch 9.2
• polygon – a closed figure in a plane formed by segments called sides.
• similar polygons – polygons that are the same shape but not necessarily the same size.
• scale drawing – used to represent something that is too large or too small to be drawn to actual size.
Ch 9.2
Ch 9.2
Use a Similarity Statement
If ΔABC ~ ΔRST, list all pairs of congruent angles and write a proportion that relates the corresponding sides.
Ch 9.2
Use a Similarity Statement
Use the similarity statement.
ΔABC ~ ΔRST
Congruent Angles: A R, B S, C T
Answer:
Ch 9.2
If ΔGHK ~ ΔPQR, determine which of the following similarity statements is not true.
A. HGK QPR
B.
C. K R
D. GHK QPR
Ch 9.2
Identify Similar Polygons
A. MENUS Tan is designing a new menu for the restaurant where he works. Determine whether the size for the new menu is similar to the original menu. If so, write the similarity statement and scale factor. Explain your reasoning.Original Menu: New Menu:
Ch 9.2
Identify Similar Polygons
Step 1 Compare corresponding angles.
Since all angles of a rectangle are right angles and right angles are congruent, corresponding angles are congruent.
Step 2 Compare corresponding sides.
Answer: Since corresponding sides are not proportional, ABCD is not similar to FGHK. So, the menus are not similar.
Ch 9.2
Identify Similar Polygons
B. MENUS Tan is designing a new menu for the restaurant where he works. Determine whether the size for the new menu is similar to the original menu. If so, write the similarity statement and scale factor. Explain your reasoning.Original Menu: New Menu:
Ch 9.2
Identify Similar Polygons
Step 1 Compare corresponding angles.
Since all angles of a rectangle are right angles and right angles are congruent, corresponding angles are congruent.
Step 2 Compare corresponding sides.
Ch 9.2
Answer: Since corresponding sides are proportional, ABCD ~ RSTU. So, the menus are similar with a scale factor of . __4
5
A. Thalia is a wedding planner who is making invitations. Determine whether the size for the new invitations is similar to the original invitations used. If so, choose the correct similarity statement and scale factor.
A. BCDE ~ FGHI, scale factor =
B. BCDE ~ FGHI, scale factor =
C. BCDE ~ FGHI, scale factor =
D. BCDE is not similar to FGHI.
__12
__45
__38
Original: New:
Ch 9.2
B. Thalia is a wedding planner who is making invitations. Determine whether the size for the new invitations is similar to the original invitations used. If so, choose the correct similarity statement and scale factor.
A. BCDE ~ WXYZ, scale factor =
B. BCDE ~ WXYZ, scale factor =
C. BCDE ~ WXYZ, scale factor =
D. BCDE is not similar to WXYZ.
__12
__45
__38
Original: New:
Ch 9.2
Use Similar Figures to Find Missing Measures
A. The two polygons are similar. Find x.
Use the congruent angles to write the corresponding vertices in order.
polygon ABCDE ~ polygon RSTUV
Ch 9.2
Use Similar Figures to Find Missing Measures
Write a proportion to find x.
Similarity proportion
Cross Products Property
Multiply.
Divide each side by 4. Simplify.
Answer: x = __92
Ch 9.2
Use Similar Figures to Find Missing Measures
B. The two polygons are similar. Find y.
Use the congruent angles to write the corresponding vertices in order.
polygon ABCDE ~ polygon RSTUV
Ch 9.2
Use Similar Figures to Find Missing Measures
Similarity proportion
Cross Products Property
Multiply.
Subtract 6 from each side.
Divide each side by 6 and simplify.
AB = 6, RS = 4, DE = 8, UV = y + 1
Answer: y = __313
Ch 9.2
A. a = 1.4
B. a = 3.75
C. a = 2.4
D. a = 2
A. The two polygons are similar. Solve for a.
Ch 9.2
A. 1.2
B. 2.1
C. 7.2
D. 9.3
B. The two polygons are similar. Solve for b.
Ch 9.2
Ch 9.2
Use a Scale Factor to Find Perimeter
If ABCDE ~ RSTUV, find the scale factor of ABCDE to RSTUV and the perimeter of each polygon.
Ch 9.2
Use a Scale Factor to Find Perimeter
The scale factor ABCDE to RSTUV is or . ___AEVU
__47
Write a proportion to find the length of DC.
Since DC AB and AE DE, the perimeter of ABCDE is 6 + 6 + 6 + 4 + 4 or 26.
Write a proportion.
4(10.5)= 7 ● DC Cross Products Property
6 = DC Divide each side by 7.
Ch 9.2
Use a Scale Factor to Find Perimeter
Use the perimeter of ABCDE and scale factor to write a proportion. Let x represent the perimeter of RSTUV.
Theorem 7.1
Substitution
4x = (26)(7) Cross Products Property
x = 45.5 Solve.
Ch 9.2
Answer: The perimeter of ABCDE is 26 and the perimeter of RSTUV is 45.5.
A. LMNOP = 40, VWXYZ = 30
B. LMNOP = 32, VWXYZ = 24
C. LMNOP = 45, VWXYZ = 40
D. LMNOP = 60, VWXYZ = 45
If LMNOP ~ VWXYZ, find the perimeter of each polygon.
Ch 9.2