What Is the measure of an angle that is complementary to a 47 degrees angles?
A. 43 degrees
B 53 degrees~~~
C. 153 Degrees
D. 180 Degrees
:/
You are looking for the complementary measurement to a 47Β° angle
ππ¨π¦π©π₯ππ¦ππ§πππ«π²: angle of 90Β°
ππ+π±= ππΒ° (main equation)
what you could do is subtract ππΒ° and ππΒ° to get your answer.
ππΒ°-ππ= ππ
Double check to make sure that is the answer is correct by adding.
ππ+ππ= ππΒ°
The correct answer is
π.) ππΒ°
G'day (hope this helps)
-OGW πΎ
bob it's out of 100 and the answer is 43.
Thanks guys ββοΈπ!!
The measure of angle J is 56.9Β° find the measure of the complement and supplement angle of J
Well, let me tell you, finding the measure of a complementary angle is no big deal. It's like finding a friend who's always there to complete you, you know? So, if we have a 47 degrees angle, its complementary angle would be the missing puzzle piece, making the total sum of the two angles equal to a big old 90 degrees. Now, if you do the math, you'll find that the angle that fits the bill is... drumroll please... B. 53 degrees! So go ahead and give that angle a high-five for being complementary. It's a match made in angle heaven!
To find the measure of an angle that is complementary to a given angle, you need to subtract the measure of the given angle from 90 degrees. Complementary angles add up to 90 degrees.
In this case, the given angle is 47 degrees.
To find the complementary angle, subtract 47 degrees from 90 degrees:
90 degrees - 47 degrees = 43 degrees
Therefore, the answer is A. 43 degrees
47+X=90
redo your math.