Question

m is the mid - point of the segment. find the segment lengths.

1. find am and mc.
2. find mt and rt.

find the coordinates of the mid - point of km.

1. (-3,2)m (-3,-4)k
2. m(4,1) k(2,-3)

st bisects ∠rsu. find the angle measures.

1. find m∠rst and m∠tsu.
2. find m∠tsu and m∠rsu.

bd bisects ∠abc. find the value of the variable.

1. 88° 3x°
2. 56° (y + 10)°

determine whether the angles are complementary, supple -

Explanation:

1.

Step1: Recall mid - point property

Since \(M\) is the mid - point of segment \(AC\) and \(AC = 28\), then \(AM=MC=\frac{AC}{2}\).

Step2: Calculate segment lengths

\(AM = MC=\frac{28}{2}=14\)

Step1: Recall mid - point property

Since \(M\) is the mid - point of segment \(RT\) and \(RM = 20.5\), then \(MT=RM\) and \(RT = 2RM\). So \(MT = 20.5\) and \(RT=2\times20.5 = 41\)

Step1: Use mid - point formula

The mid - point formula for two points \((x_1,y_1)\) and \((x_2,y_2)\) is \((\frac{x_1 + x_2}{2},\frac{y_1 + y_2}{2})\). Here \(K(-3,-4)\) and \(M(-3,2)\), so \(x_1=-3,y_1=-4,x_2=-3,y_2 = 2\).

Step2: Calculate coordinates

\(x=\frac{-3+( - 3)}{2}=\frac{-6}{2}=-3\), \(y=\frac{-4 + 2}{2}=\frac{-2}{2}=-1\). The mid - point is \((-3,-1)\)

Answer:

\(AM = 14\), \(MC = 14\)

2.