CR and DS are perpendiculars dropped from AB to PQ , and AB is perpendicular to CR and DS . If CR = DS, which statement must be true?

A.) m∠RCD = m∠SDB ÷ 2

B.) m∠RCD = m∠ACD

C.) m∠RCD = m∠ACD ÷ 2

D.) m∠RCD = m∠ACD ÷ 3

E.) m∠RCD = m∠ACD × 2

The answer is C.) m∠RCD = m∠ACD ÷ 2

RCD = ACD divided by two.

RCD = 90 degrees.

ACD÷2 = 180÷2 = 90 degrees.

So, your answer is C.

Hope this helped. Have a great day!

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eudora eudora · Answer 2 · 2019-04-09T22:58:31+02:00

Answer:

Optin C. m∠RCD = m∠ACD ÷ 2

Step-by-step explanation:

CR and DS are the perpendiculars dropped from Ab and PQ.

CR = DS is given in the question.

we have to tell the true statement given in the options.

Since sum of all angles at a given point on a straight line is 180°

m∠ACD = m∠ACR + m∠RCD = 180°

it is given that m∠ACR = m∠RCD (CR is perpendicular to AB and PQ both)

Therefore m∠ACD = 2× m∠RCD

⇒ m∠RCD = m∠ACD ÷ 2

Therefore Option C). is the answer.

CR and DS are perpendiculars dropped from AB to PQ , and AB is perpendicular to CR and DS . If CR = DS, which statement must be true? A.) m∠RCD = m∠SDB ÷ 2 B.) m∠RCD = m∠ACD C.) m∠RCD = m∠ACD ÷ 2 D.) m∠RCD = m∠ACD ÷ 3 E.) m∠RCD = m∠ACD × 2

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Otras preguntas

CR and DS are perpendiculars dropped from AB to PQ , and AB is perpendicular to CR and DS . If CR = DS, which statement must be true?

A.) m∠RCD = m∠SDB ÷ 2

B.) m∠RCD = m∠ACD

C.) m∠RCD = m∠ACD ÷ 2

D.) m∠RCD = m∠ACD ÷ 3

E.) m∠RCD = m∠ACD × 2