This math topic focuses on calculating the perimeter of various geometric shapes, primarily rectangles, by determining how many smaller segments are required to wrap around a larger shape. The skill practiced involves division and multiplication, applying the concept of perimeter in a practical context. Each problem presents a different shape and set of possible answers, where students must analyze the illustration and calculate how many units of a given smaller segment fit into the total perimeter of the larger shape. This area of study is part of a broader introduction to area and perimeter logic.
Work on practice problems directly here, or download the printable pdf worksheet to practice offline.
Complete these online problems with 80% or 4 correct answers in a row. Results are immediate.
How many of the small line segment will it take to wrap around the larger shape?
Math worksheet on 'Perimeter of a Rectangle - Segment Coverage from Perimeter (Level 2)'. Part of a broader unit on 'Area and Perimeter Logic - Practice' Learn online: app.mobius.academy/math/units/area_and_perimeter_geometry_logic_practice/ |
How many of the small line segment will it take to wrap around the larger shape? |
10 |
49 |
55 |
58 |
34 |
19 |
How many of the small line segment will it take to wrap around the larger shape? |
24 |
22 |
16 |
6 |
20 |
2 |
How many of the small line segment will it take to wrap around the larger shape? |
18 |
22 |
36 |
26 |
38 |
24 |
How many of the small line segment will it take to wrap around the larger shape? |
26 |
14 |
28 |
38 |
24 |
16 |
How many of the small line segment will it take to wrap around the larger shape? |
20 |
36 |
26 |
22 |
28 |
34 |
How many of the small line segment will it take to wrap around the larger shape? |
14 |
30 |
20 |
28 |
16 |
24 |
How many of the small line segment will it take to wrap around the larger shape? |
63 |
36 |
42 |
51 |
15 |
12 |