Carcass wrote:
Attachment:
The attachment GRe in the triangle.jpg is no longer available
In right triangle ABC shown, \( \overline{CM}\) is the median to the hypotenuse. If AC is 24, and BC is 10, what is the measure of \( \overline{CM}\)?
In right traingle ABC;
\(AB^2 = BC^2 + AC^2\)
\(AB^2 = 10^2 + 24^2\)
\(AB = \sqrt{676} = 26\)
Also, if CM is the median then AM = MB = \(\frac{26}{2} = 13\)
Approach 1:We can use the Theorem:
In a right triangle, the median drawn to the hypotenuse has the measure half the hypotenuse.Therefore, CM = \(\frac{26}{2} = 13\)
Approach 2:Draw AB' parallel to BC with AB' = BC = 10 and B'B parallel to AC with B'B = AC = 24
Notice that we get a rectangle AB'BC
Property:
Diagonals of a rectangle are equal and bisect each otheri.e. CM = MB = B'M = AM = 13
Attachment:
what is the measure of CM.png [ 5.34 KiB | Viewed 1289 times ]