SSAT Upper Level

Transformations

Reflections, rotations, translations, and symmetry

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Have you ever played a video game where your character has to slide under a wall, spin around to dodge a fireball, or look into a magical mirror? 🎮 Well, guess what? You were already doing Geometry Transformations! Transformations are just fancy math words for moving a shape around without changing what it actually is. It's like taking a slice of pizza—whether you slide it across the table, spin it around, or flip it upside down (uh oh, messy! 🍕), it's still the exact same slice of pizza!

In Geometry, we have three main moves. First, there's a Translation. That's just a slide! Imagine sliding across a slippery floor in your socks. Next is a Rotation, which means spinning. Think of a basketball spinning on your finger. A full spin is 360 degrees, so a half spin is $\frac{1}{2}$ of that, or 180 degrees! Finally, we have a Reflection, which is a flip. It's exactly what you see when you look in the mirror in the morning! 🪞

The SSAT loves to test these moves. They also love Symmetry, which is when you can fold something perfectly in half so both sides match, like a beautiful butterfly. On the SSAT, you'll be a 'shape detective,' figuring out exactly how a shape moved from point A to point B. Don't worry, once you learn the secret moves, these questions become super fun puzzles to solve! 🧩 Let's get moving!

Key Formula

When reflecting a point over the x-axis, the x-coordinate stays the same and the y-coordinate flips its sign:

(x, y) \to (x, - y)

. (Bonus: A 180-degree rotation is exactly

\frac{1}{2}

of a full circle!)

Practice Questions

3 practice questions for SSAT Upper Level

Q1 Hard

Point

P

is located at

(- 3, 4)

in the xy-coordinate plane. If point

P

is reflected across the y-axis and then translated 5 units down, what are the new coordinates of the point?

(3, - 1)

(- 3, - 1)

C (3, 9)

(- 8, 4)

(4, - 3)

Show Solution

First, apply the reflection across the y-axis. When a point (x, y) is reflected across the y-axis, its x-coordinate changes sign, resulting in $(- x, y)$ . Reflecting $(- 3, 4)$ across the y-axis gives (3, 4). Next, translate the new point 5 units down. Translating a point down decreases its y-coordinate by the given amount, resulting in $(x, y - 5)$ . Subtracting 5 from the y-coordinate of (3, 4) yields $(3, 4 - 5)$ , which simplifies to $(3, - 1)$ .

Answer: A

Q2 Hard

Point

A

is located at (2, 5) in the xy-coordinate plane. It is rotated

18 0^{\circ}

about the origin to create point

B

. What is the distance between point

A

and point

B

229

29

14

10

429

Show Solution

First, find the coordinates of point $B$ . When a point (x, y) is rotated $18 0^{\circ}$ about the origin, its new coordinates are $(- x, - y)$ . Therefore, rotating point A(2, 5) by $18 0^{\circ}$ gives point $B (- 2, - 5)$ . Next, use the distance formula, $d = (x_{2} - x_{1})^{2} + (y_{2} - y_{1})^{2}$ , to find the distance between (2, 5) and $(- 2, - 5)$ . Substituting the coordinates gives $d = (- 2 - 2)^{2} + (- 5 - 5)^{2} = (- 4)^{2} + (- 10)^{2} = 16 + 100 = 116$ . Finally, simplify the radical: $116 = 4 \times 29 = 229$ .

Answer: A

Q3 Hard

Square

A B C D

has vertices at

A (- 2, 2)

, B(2, 2),

C (2, - 2)

, and

D (- 2, - 2)

. The square is first translated 3 units to the right and 4 units up, and then reflected across the x-axis. What are the final coordinates of the vertex that corresponds to the original vertex

C

(5, - 2)

B (5, 2)

(- 5, 2)

(- 1, - 6)

(- 2, 5)

Show Solution

Begin with the coordinates of the original vertex $C$ , which is $(2, - 2)$ . The first transformation is a translation 3 units to the right and 4 units up. This means adding 3 to the x-coordinate and 4 to the y-coordinate: $(2 + 3, - 2 + 4) = (5, 2)$ . The second transformation is a reflection across the x-axis. When a point (x, y) is reflected across the x-axis, the sign of its y-coordinate changes, resulting in $(x, - y)$ . Applying this rule to (5, 2) yields the final coordinates $(5, - 2)$ .

Answer: A

Tips & Strategies

Draw it out! ✏️ If the SSAT asks you to reflect or rotate a shape, use your pencil to lightly draw the new shape on the grid. Don't try to do the whole flip in your head!
Remember the Mirror Rule: When reflecting over the x-axis or y-axis, count the jumps from the point to the mirror line, then count the exact same number of jumps on the other side.
Translations are just slides. If a question says 'translate up 3 and right 2', just take one corner of the shape, move it up 3 and right 2, and then draw the rest of the shape from there.

Common Mistakes

Watch out for mixing up the axes! 🛑 The x-axis is the flat horizontal line (like the horizon), and the y-axis is the tall vertical line (like a yo-yo going up and down).
Don't forget that rotating, reflecting, and translating NEVER change the size of the shape! If your new shape is bigger or smaller, something went wrong.

Frequently Asked Questions

Do I need to memorize complicated rotation formulas for the SSAT?

Nope! For the SSAT, you usually just need to know how to rotate shapes 90 or 180 degrees visually. If you get stuck, try physically turning your test booklet to see what the shape looks like when spun!

What exactly is a line of symmetry?

It's an imaginary line where you can fold an image and have both halves match perfectly. Think of folding a piece of paper to cut out a perfect heart!

Will there be questions about changing the size of a shape?

Sometimes! That's called a 'dilation'. Just remember that a dilation is the ONLY transformation that changes a shape's size. If a shape has a scale factor of $\frac{1}{2}$ , it becomes half as large!

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