Polygon ABCDEFGH will be dilated by a scale factor of 3.4 with the origin as the center of dilation to produce polygon ABCDEF
will the length of A' F' be?
ОА.
1.7 units
ОВ.
2 units
О С.
3.4 units
OD.
6.8 units
Polygon ABCDEFGH is dilated by a scale factor of 3.4 with the origin as the center of dilation to produce polygon A'B'C'D'EFG'H'.
As, when a polygon is dilated , the two pre image and image are similar to each other.
Also, similar shapes have same ratio of their corresponding sides length.
→Pre image (Polygon ABCDEFGH) ~Image ( A'B'C'D'EFG'H').
Dilation factor >1, equal to 3.4.
AB/A'B'=BC/B'C'=CD/C'D'=DE/D'E'=EF/E'F'=FG/F'G'=GH/G'H'=AH/A'H'=1/3.4.
A'H'=3.4*AH
Length of segment A'H'=3.4 AH.
Polygon ABCDEFGH is dilated by a scale factor of 3.4 with the origin as the center of dilation to produce polygon A'B'C'D'EFG'H'.
As, when a polygon is dilated , the two pre image and image are similar to each other.
Also, similar shapes have same ratio of their corresponding sides length.
→Pre image (Polygon ABCDEFGH) ~Image ( A'B'C'D'EFG'H').
Dilation factor >1, equal to 3.4.
AB/A'B'=BC/B'C'=CD/C'D'=DE/D'E'=EF/E'F'=FG/F'G'=GH/G'H'=AH/A'H'=1/3.4.
A'H'=3.4*AH
Answer: Length of segment A'H'=3.4 AH.
Polygon ABCDEFGH is dilated by a scale factor of 3.4 with the origin as the center of dilation to produce polygon A'B'C'D'EFG'H'.
As, when a polygon is dilated , the two pre image and image are similar to each other.
Also, similar shapes have same ratio of their corresponding sides length.
→Pre image (Polygon ABCDEFGH) ~Image ( A'B'C'D'EFG'H').
Dilation factor >1, equal to 3.4.
AB/A'B'=BC/B'C'=CD/C'D'=DE/D'E'=EF/E'F'=FG/F'G'=GH/G'H'=AH/A'H'=1/3.4.
A'H'=3.4*AH
Answer: Length of segment A'H'=3.4 AH.
Polygon ABCDEFGH is dilated by a scale factor of 3.4 with the origin as the center of dilation to produce polygon A'B'C'D'EFG'H'.
As, when a polygon is dilated , the two pre image and image are similar to each other.
Also, similar shapes have same ratio of their corresponding sides length.
→Pre image (Polygon ABCDEFGH) ~Image ( A'B'C'D'EFG'H').
Dilation factor >1, equal to 3.4.
AB/A'B'=BC/B'C'=CD/C'D'=DE/D'E'=EF/E'F'=FG/F'G'=GH/G'H'=AH/A'H'=1/3.4.
A'H'=3.4*AH
Length of segment A'H'=3.4 AH.
Polygon ABCDEFGH is dilated by a scale factor of 3.4 with the origin as the center of dilation to produce polygon A'B'C'D'EFG'H'.
As, when a polygon is dilated , the two pre image and image are similar to each other.
Also, similar shapes have same ratio of their corresponding sides length.
→Pre image (Polygon ABCDEFGH) ~Image ( A'B'C'D'EFG'H').
Dilation factor >1, equal to 3.4.
AB/A'B'=BC/B'C'=CD/C'D'=DE/D'E'=EF/E'F'=FG/F'G'=GH/G'H'=AH/A'H'=1/3.4.
A'H'=3.4*AH
Answer: Length of segment A'H'=3.4 AH.
Polygon ABCDEFGH is dilated by a scale factor of 3.4 with the origin as the center of dilation to produce polygon A'B'C'D'EFG'H'.
As, when a polygon is dilated , the two pre image and image are similar to each other.
Also, similar shapes have same ratio of their corresponding sides length.
→Pre image (Polygon ABCDEFGH) ~Image ( A'B'C'D'EFG'H').
Dilation factor >1, equal to 3.4.
AB/A'B'=BC/B'C'=CD/C'D'=DE/D'E'=EF/E'F'=FG/F'G'=GH/G'H'=AH/A'H'=1/3.4.
A'H'=3.4*AH
Answer: Length of segment A'H'=3.4 AH.
Polygon ABCDEFGH is dilated by a scale factor of 3.4 with the origin as the center of dilation to produce polygon A'B'C'D'EFG'H'.
As, when a polygon is dilated , the two pre image and image are similar to each other.
Also, similar shapes have same ratio of their corresponding sides length.
→Pre image (Polygon ABCDEFGH) ~Image ( A'B'C'D'EFG'H').
Dilation factor >1, equal to 3.4.
AB/A'B'=BC/B'C'=CD/C'D'=DE/D'E'=EF/E'F'=FG/F'G'=GH/G'H'=AH/A'H'=1/3.4.
A'H'=3.4*AH
Answer: Length of segment A'H'=3.4 AH.
Polygon ABCDEFGH is dilated by a scale factor of 3.4 with the origin as the center of dilation to produce polygon A'B'C'D'EFG'H'.
As, when a polygon is dilated , the two pre image and image are similar to each other.
Also, similar shapes have same ratio of their corresponding sides length.
→Pre image (Polygon ABCDEFGH) ~Image ( A'B'C'D'EFG'H').
Dilation factor >1, equal to 3.4.
AB/A'B'=BC/B'C'=CD/C'D'=DE/D'E'=EF/E'F'=FG/F'G'=GH/G'H'=AH/A'H'=1/3.4.
A'H'=3.4*AH
Answer: Length of segment A'H'=3.4 AH.
Answer: 440 grams for 1.54 is the better value
Explanation:
Take the price and divide by the number of grams
1.54 / 440 =0.0035 per gram
1.26 / 340 =0.003705882 per gram
0.0035 per gram < 0.003705882 per gram
0
23 449
rating
Get help with homework
