Plans for a New Medical Complex: Will Buildings Be Congruent?

Will Building B be congruent to Building A based on the given vertices?

If the vertices of Building B are located at (4x1, 4y1), (4x2, 4y2), (4x3, 4y3), and (4x4, 4y4) with Building A as reference, will Building B exhibit congruence with Building A?

Answer:

Building B will not be congruent to Building A as the vertices suggest uniform scaling but additional information indicates the height is scaled differently, disrupting congruence.

To determine whether Building B will be congruent to Building A, we need to examine the properties of congruence in geometry. In this context, congruent means that two figures have the same shape and size, though they may be reflected, rotated, or translated.

The given coordinates for the vertices of Building B suggest it's a transformation of the vertices of Building A by a scale factor of 4. If every vertex of Building A is scaled by the same factor, the resulting shape should be congruent.

However, the additional information provided indicates that Building B's height is twice that of Building A, implying that a uniform scaling factor of 4 is not applied in all dimensions. Hence, Building B will not be congruent to Building A.

We also have a mathematical formulation given as X = Y x 2 + 1. If this represents the proportionality of columns along the lengths and widths of the buildings, and the vertices of Building B are scaled differently in the x and y axes, this would disrupt the proportion and further imply a lack of congruence.

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