SOLUTION: Find the reference angle t for the given angle t
(a) . t = 7π/3
(b). t = 37π/4
(c). t = -23π/6
Please explain
THANKS
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Trigonometry-basics
-> SOLUTION: Find the reference angle t for the given angle t
(a) . t = 7π/3
(b). t = 37π/4
(c). t = -23π/6
Please explain
THANKS
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Question 928536: Find the reference angle t for the given angle t
(a) . t = 7π/3
(b). t = 37π/4
(c). t = -23π/6
Please explain
THANKS Found 2 solutions by rothauserc, Alan3354:Answer by rothauserc(4718) (Show Source):
You can put this solution on YOUR website! (a) t = 7π/3
t = (7*180) / 3 = 420 degrees
t= 420 - 360 = 60 degrees
reference angle for t is acute so = 60 degrees
(b) t = 37π/4
t = (37*180) / 4 = 1665 = 1665 - 1440 = 225
reference angle for t is acute so = 225 - 180 = 45 degrees
(c) t = -23π/6
t = (-23*180) / 6 = −690 = -690 +360 = -330
this time we rotate counter clockwise
reference angle for t is acute so = -330 +360 = 30 degrees
You can put this solution on YOUR website! Find the reference angle t for the given angle t
(a) . t = 7π/3
Subtract 2pi repeatedly until it's less than 2pi
(b). t = 37π/4
Same as (a)
(c). t = -23π/6
Add 2pi repeatedly until it's > 0.
