What is the area of the triangle formed by points A, B, and C if A to B is 7.5 inches and A to D is 16.8 inches?

• A. 56 square inches
• B. 63 square inches
• C. 70 square inches
• D. 75 square inches

Answer: (B)

To find the area of the triangle formed by points A, B, and C using the information given, we can apply the formula for the area of a triangle when the lengths of two sides and the included angle are known. However, in this case, we are only given the lengths of two segments (A to B and A to D) without additional context or angles.

If we consider points A, B, and D positioning with respect to each other, it helps to clarify what triangle we are dealing with. Assuming a scenario where D is a point on the line extending from A to B, the length of A to D does not directly provide information about the triangle formed by A, B, and C unless we also know how point C is positioned in relation to points A and B.

The area of a triangle can also be determined by the formula:

[

\text{Area} = \frac{1}{2} \times \text{base} \times \text{height}

]

In many triangle-related questions, using three specific coordinate points or segment lengths is crucial.

In this context, if the value calculated or derived through other geometric properties or additional given heights or angles correctly leads to a computed value of 63