Determine whether the polygons to the right are similar. If so, write a similarity statement and give the scale factor If not, explain. Select the correct choice and fill in any answer boxes in your choice below. Yes, \( \Delta H J K \sim \Delta \mathrm{VWX} \). The scale factor of \( \Delta H J K \) to \( \Delta \mathrm{VWX} \) is B. No, because lengths of corresponding sides are not proportional. (Type an integer or a simplified fraction.) C. Yes, \( \Delta H J K \sim \Delta X V W \). The scale factor of \( \Delta H J K \) to \( \Delta X \mathrm{VW} \) is \( \square \). (Type an integer or a simplified fraction.) D. Yes, \( \Delta H J K \sim \Delta V X W \). The scale factor of \( \Delta H J K \) to \( \Delta \mathrm{VXW} \) is \( \square \). (Type an integer or a simplified fraction.) Ho, because corresponding angles are not congruent. Help me solve this View an example Get more help a

To determine if the polygons are similar, you need to check whether their corresponding angles are equal and their sides are in proportion. If both conditions hold true, then the polygons are similar. If we have, for instance, \( \Delta HJK \) with angles matching \( \Delta VWX \) and the ratio of the lengths of corresponding sides is consistent, you could say: "Yes, \( \Delta HJK \sim \Delta VWX \). The scale factor from \( \Delta HJK \) to \( \Delta VWX \) is \( \frac{1}{2} \)". However, if the side lengths do not maintain the same ratio or if the angles differ, then you could choose option B and state why they do not form similar triangles. Just keep an eye on those angles and sides! For example, if the angles of \( \Delta HJK \) are \( 30^\circ, 60^\circ, 90^\circ \) and \( \Delta VWX \) has angles \( 30^\circ, 60^\circ, 90^\circ \) as well, proceed with confirming the side length ratios for similarity!