Question

Which of the following are not similar figures?

• A. Circles
• B. Squares
• C. Isosceles triangles
• D. Equilateral triangles

Hint:

For figures to be similar, their corresponding angles must be equal, and the ratio of their corresponding sides must be constant. Consider the properties of each geometric shape when determining similarity.

Answer 1

The Correct Option is C

Step 1: Understand the definition of similar figures.
Two figures are similar if they have the same shape but not necessarily the same size. This means their corresponding angles are equal, and their corresponding sides are in proportion. Step 2: Analyze each option. \begin{enumerate} \item Circles: All circles have the same shape. The ratio of their circumferences to their diameters is always \( \pi \). Therefore, any two circles are similar. \item Squares: All squares have the same shape. Each angle in a square is \( 90^\circ \), and the ratio of their corresponding sides is constant. Therefore, any two squares are similar. \item Isosceles triangles: Isosceles triangles have two sides of equal length and two equal angles. However, the angles of an isosceles triangle can vary. For example, one isosceles triangle could have angles \( 40^\circ, 70^\circ, 70^\circ \), while another could have angles \( 100^\circ, 40^\circ, 40^\circ \). Since their corresponding angles are not necessarily equal, not all isosceles triangles are similar. \item Equilateral triangles: All equilateral triangles have the same shape. Each angle in an equilateral triangle is \( 60^\circ \), and the ratio of their corresponding sides is constant. Therefore, any two equilateral triangles are similar. \end{enumerate} Step 3: Identify the figures that are not necessarily similar.
From the analysis above, isosceles triangles are not necessarily similar because their angles can vary.