Answer:
Part 1) m∠DBC=25°
Part 2) m∠DCB=65°
Part 3) m∠CDB=90°
Part 4) m∠ACD=25°
Part 5) m∠ADC=90°
Explanation:
see the attached figure to better understand the problem
step 1
Find the measure of angle DBC
we know that
The sum of the interior angles of a triangle must be equal to 180 degrees
In the right triangle ABC
m∠A+m∠B+m∠C=180° ----> equation A
we have
m∠A=65° ----> given problem
m∠C=90° ----> given problem
Substitute the given values in the equation A and solve for m∠B
65°+m∠B+90°=180°
m∠B+155°=180°
m∠B=180°-155°
m∠B=25°
Remember that the measure of Angle B is equal to say the measure of angle DBC
so
m∠B=m∠DBC
therefore
m∠DBC=25°
step 2
Find the measure of angle DCB and angle CDB
In the right triangle DBC
The sum of the interior angles of a triangle must be equal to 180 degrees
m∠DBC+m∠DCB+m∠CDB=180°
we have
m∠DBC=25°
m∠CDB=90° ----> is a right angle (CD is the height to AB)
substitute the values and solve for m∠DCB
25°+m∠DCB+90°=180°
m∠DCB+115°=180°
m∠DCB=180°-115°=65°
step 3
Find the measure of angle ACD
we know that
m∠ACD+m∠DCB=90° -----> by complementary angles
we have
m∠DCB=65°
substitute the value
m∠ACD+65°=90°
m∠ACD=90°-65°=25°
step 4
Find the measure of angle ADC
m∠ADC=90° ----> is a right angle (CD is the height to AB)