Tanx 0
What is the solution of tanx = 0 where x is in radians? ۔
I need 2 solutions for this. I'm thinking of 1/4 foot and 5/4 foot.
updateThe answer is choice.
1/4 foot, 1/2 foot, 3/4 foot, 5/4 foot, 3/2 foot, 7/4 foot, 2 feet ....
Think of it this way ... If sin (x) = 0 tan (x) = 0 ... Consider tan (x) = sin (x) / cos (x) then sin (x) = 0 Then tan (x) then sin (x) = pi and 2pi ... if I'm fine ...
This page can help you.
D:
What is the solution of tanx = 0 where x is in radians?
I need 2 solutions for this. I'm thinking of 1/4 foot and 5/4 foot.
Tanx 0
Tanx 0
What is the solution of tanx = 0 where x is in radians? 3
I need 2 solutions for this. I think it's 1/4 foot and 5/4 foot.
To updateThere are answer options
1/4 ft, 1/2 ft, 3/4 ft, 5/4 ft, 3/2 ft, 7/4 ft, 2 ft ...
Think of it this way ... if sin (x) = 0 tan (x) = 0 ... consider tan (x) = sin (x) / cos (x) then sin (x) = 0 then tan (x) then sin (x) = pi and 2pi ... if I am correct ...
This page can help you.
D:
What is the solution of tanx = 0 where x is in radians?
I need 2 solutions for this. I think it's 1/4 foot and 5/4 foot.
Tanks 0
I think it will be 0 and pi cuz (senx / cosx) = 0 so senx (y value) is 0 and where y is 0 is 0 and pi is on the unit circle.
Tanx 0
Tanx 0
tanx0 radian solution
0 and pi.
Note that tanx = (sinx) / (cosx)
Therefore, since sinx = 0, tanx = 0.
If sin3x = 1, then x = (1/6) (4n * pi + pi), where n is a number. Or x = (2n * pi) / 3 + pi / 6, where n is a number. If 1 square (3) tin (x) = 0 ==> tin (x) = 1 / square (3) ==> x = pi (n + 1/6), where n is a number.
