Solve the equation sin x +cos x =1 | IB Math

2 sin(x) cos(x) is just sin(2x) !!! Much easier to solve this way!

Don’t need to watch. Just square both sides!!!

sin(x) + cos(x) = 1
so 1 + sin(2x) = 1
sin(2x) = 0
2x = 0, 2x = 180, 2x = 360, 2x = 540, 2x = 720
x = 0, 90, 180, 270 or 360
180 is invalid and so is 270
so
x = 0, x = 180, or x = 360
On 0

Another solution is to multiply both sides to √2/2
√2/2(sinx + cosx) = √2/2
√2/2sinx + √2/2cosx = √2/2
✍️ as we know, cos45°=sin45°=√2/2
cos45°sinx + sin45°cosx = √2/2
✍️ and it looks very similar to:
sin(α+β)= sinα*cosβ + sinβ*cosα
so we rewrite it as sin(45°+x)=√2/2
✍️ and as we know, if sinx = a, (a ∈ (0;1) ) the solution is:
x = (-1)^k*arcsin(a)+πk, k ∈ Z
45°+x = (-1)^k*45+180°*k, k ∈Z
x = (-1)^k*45+180°k - 45°, k ∈Z
we are given that x ∈[0;360°]
k=0, x =45°-45°= 0✅
k = 1, x = -45+180-45=90°✅
k = 2, x = 45+360-45 = 360°✅
k = -1, x = -45-180-45 = -270 ❌
and no need to check anymore, because none will satisfy the given x
I guess this is kinda a bit longer, but just wanted to write ^^ hope, I haven't done any mistakes 😅

You can easily deduce that this can only happen at the right angles (0, pi/2, pi, 3pi/2) through case analysis of the quadrants. In the first quadrant (0, pi/2) the sum is always greater than 1 because the sum of two side lengths of a triangle is always greater than the length of the other side. In the second and fourth quadrants (pi/2, pi) and (3pi/2, 2pi) the sum is always less than 1 because one (either cos(x) or sin(x)) is negative and the other is positive but less than 1. Finally, in the third quadrant the sum is negative.
Knowing this, we just need to try these 4 angles. After testing, we can conclude that x = 0, pi/2 and all equivalent angles modulo 2pi.

Good explanation at end of the video.

I approached the question like this, 1-cosx = 2sin²x/2 & sinx = 2sinx/2cosx/2, divide both sides by sinx/2 and the equation becomes 2sinx/2 = 2cosx/2, so tan x/2 = nπ+pie/4 & sinx = 0 which is nπ.

sinx + cosx = 1
(sinx + cosx)^2 = 1^2 = 1
2(sinx)(cosx) = 0
sinx = 0, cosx = 1
or
cosx = 0, sinx = 1
x = 2nπ, (4n + 1)π/2

sin x + cos x = 1
Sqrt 2*sin (x+Pi/4)=1
Sin(x+Pi/4)=1/sqrt 2
x+Pi/4=Pi/4+2nPi
x=0 or 2Pi

cos(x)=(e^ix+e^-ix)/2
sin(x)=-i(e^ix-e^-ix)/2
(1-i)e^ix+(1+i)e^-ix=2
1-i=sqrt(2)e^-ipi/4
1+i=sqrt(2)e^ipi/4
e^i(x-pi/4)+e^-i(x-pi/4)=sqrt(2)
cos(x-45°)=1/sqrt(2)
x-45°={-45°, 45°, 315°}
x={0°, 90°, 360°}

sinx+tg45*cosx = 1 , multiply both sides by cos45 .... you get sin(x + 45) = cos45 .....

How about we take sin x = 1-cos x...now use the formula cosx =1-2sin^x/2.....get 1-cos x = 2sin^2x/2....now we know sinx = 2sinx/2cosx/2...from there you wil get....by combining the equations tan x/2 = 1 or tan pi/4.... we can use the trigonometric equation formula of Tan A = Tan B to get a general sol....now since the period of is 0 to 2pi...I think we can clip the period for tan from (-pi/2,pi/2) that way we take care of the asymptotes of tan x

+/- kpi/2

sin ( x) + cos ( x) = 1
√ 2 * cos ( x - π /4) =.1
cos ( x - π /4) = 1/√2 = cos (π /4)
x - π /4 = 2 n π + π /4, 2 n π - π /4
x = 2 n π + π/2, 2 n π, for imtegral n
x = π /2, 0, 2π, 0 are only solution in (0, π)

X= 0, X= π/2. Tiene infinitas soluciones.

2nπ+π/4 & 2nπ.

Para qué elevar al ⬛.

By Squaring both sides
1+sin2x=1
Sin2x=0
Sin2x=sin0
2x=0
X=0 degree

0:19 360 is not the same as 360 DEGREES. If you only write 360, you don't say anything that it is degrees you mean. You think it is 360 radians, 64800 degrees.