AMC 8 · 2010 · #6

Easy mode Grade 4

📗 View original problem →

Problem

A line of symmetry is a line you could draw through a shape so that one side is a mirror image of the other.

For each shape below, picture how many such lines you could draw.

Which shape has the most lines of symmetry?

Pick an answer.

(A)

equilateral triangle

(B)

non-square rhombus

(C)

non-square rectangle

(D)

isosceles trapezoid

(E)

square

View mode:

Toolkit + CCSS Solution

Understand

Restated: Among five named figures — an equilateral triangle, a non-square rhombus, a non-square rectangle, an isosceles trapezoid, and a square — which one has the most lines of symmetry?

Givens: Five candidate figures, one per answer choice; (A) equilateral triangle — three equal sides and angles; (B) non-square rhombus — four equal sides but unequal angles; (C) non-square rectangle — four right angles but adjacent sides unequal; (D) isosceles trapezoid — one pair of parallel sides plus equal legs; (E) square — four equal sides and four right angles

Unknowns: The figure (A)–(E) with the greatest number of lines of symmetry

Understand

Restated: Among five named figures — an equilateral triangle, a non-square rhombus, a non-square rectangle, an isosceles trapezoid, and a square — which one has the most lines of symmetry?

Plan

Primary tool: #1 Draw a Diagram

Secondary: #2 Make a Systematic List

Counting lines of symmetry is a visual task, so Tool #1 (Draw a Diagram) is the natural primary tool: sketch each shape and try folding it along every candidate line — vertical, horizontal, and the two diagonals. Tool #2 (Make a Systematic List) keeps the bookkeeping clean: we list the five shapes and write down each shape's count, then read off the maximum. No algebra or coordinates are needed — this is a pure attribute-of-shapes question.

Execute — Answer: E

#1 Draw a Diagram 4.G.A.3 Step 1

Sketch the equilateral triangle and try the fold lines.
Each line from a vertex to the midpoint of the opposite side folds the triangle exactly onto itself.
There are three vertices, so three such fold lines work.

$$\text{equilateral triangle: } 3 \text{ lines of symmetry}$$

💡 Folding a shape so it lands on itself is exactly the Grade 4 definition of a line of symmetry.

#1 Draw a Diagram 4.G.A.3 Step 2

Sketch a non-square rhombus (a tilted diamond with all four sides equal, but angles not $90^\circ$).
The two diagonals are fold lines and the figure lands on itself.
But the vertical and horizontal lines through the center do NOT — the slanted sides do not match up.
So the rhombus has exactly two lines of symmetry.

$$\text{non-square rhombus: } 2 \text{ lines of symmetry}$$

💡 Testing each candidate fold line one-by-one is still the Grade 4 symmetry standard.

#1 Draw a Diagram 4.G.A.3 Step 3

Sketch a non-square rectangle (think of a door).
The horizontal line through the middle and the vertical line through the middle both fold the rectangle onto itself.
But the two diagonals do NOT — the long sides land on the short sides, which are different lengths.
So the rectangle also has two lines of symmetry.

$$\text{non-square rectangle: } 2 \text{ lines of symmetry}$$

💡 Same Grade 4 fold-test — checking each candidate line directly on the drawing.

#1 Draw a Diagram 4.G.A.3 Step 4

Sketch an isosceles trapezoid (one pair of parallel sides, equal legs).
The only fold line that maps it onto itself is the vertical line through the midpoints of the two parallel sides.
That gives one line of symmetry.

$$\text{isosceles trapezoid: } 1 \text{ line of symmetry}$$

💡 Again the Grade 4 line-of-symmetry definition, applied to a specific quadrilateral.

#1 Draw a Diagram 4.G.A.3 Step 5

Sketch a square.
Both diagonals are fold lines (corner to corner), and both midlines (horizontal and vertical through the center) are fold lines.
That gives four lines of symmetry in total.

$$\text{square: } 4 \text{ lines of symmetry}$$

💡 The square has both the rhombus's diagonals AND the rectangle's midlines as fold lines — a Grade 4 observation.

#2 Make a Systematic List 3.G.A.1 Step 6

Make a systematic list and read off the maximum: triangle $3$, rhombus $2$, rectangle $2$, trapezoid $1$, square $4$.
The largest count is $4$, belonging to the square.

$$\max(3, 2, 2, 1, 4) = 4 \;\Rightarrow\; \textbf{(E) square}$$

💡 Listing each figure by its attributes (here, symmetry count) and comparing is the Grade 3 "shapes share attributes" idea.

[1] #1 4.G.A.3 Sketch the equilateral triangle and try the fold lines. Each line from a vertex

[2] #1 4.G.A.3 Sketch a non-square rhombus (a tilted diamond with all four sides equal, but ang

[3] #1 4.G.A.3 Sketch a non-square rectangle (think of a door). The horizontal line through the

[4] #1 4.G.A.3 Sketch an isosceles trapezoid (one pair of parallel sides, equal legs). The only

[5] #1 4.G.A.3 Sketch a square. Both diagonals are fold lines (corner to corner), and both midl

[6] #2 3.G.A.1 Make a systematic list and read off the maximum: triangle $3$, rhombus $2$, rect

Review

Reasonableness: A regular polygon with $n$ sides has $n$ lines of symmetry. The equilateral triangle is regular with $n = 3$, the square is regular with $n = 4$ — so the square should beat the triangle by exactly one, matching our counts. The non-square rhombus and non-square rectangle each keep only half of the square's symmetries (diagonals OR midlines, not both), giving $2$ each. The isosceles trapezoid is the least symmetric of the four-sided figures and gets just $1$. Everything fits.

Alternative: Tool #5 (Find a Pattern): more "regularity" usually means more symmetry. Rank the shapes by how regular they look — square (most regular quadrilateral, $4$), equilateral triangle (most regular triangle, $3$), rhombus and rectangle (half-regular, $2$ each), isosceles trapezoid (least regular, $1$). The pattern points straight to (E).

CCSS standards used (min grade 4)

4.G.A.3 Recognize a line of symmetry for a two-dimensional figure (Counting the lines of symmetry of each candidate figure by the fold-onto-itself test — the central skill of the whole problem.)
3.G.A.1 Understand that shapes in different categories share attributes (Comparing the five shape categories by a single shared attribute (number of lines of symmetry) and picking the largest.)

⭐ This AMC 8 problem only needs the Grade 4 "line of symmetry" idea you already know!

Problem

Toolkit + CCSS Solution

Understand

Plan

Execute — Answer: E

Review

CCSS standards used (min grade 4)

More like this