First, we need to convert the given angles from degrees to radians:
Sin(40 degrees) = Sin(40 π/180) = Sin(2π/9)Cos(10 degrees) = Cos(10 π/180) = Cos(π/18)Cos(40 degrees) = Cos(40 π/180) = Cos(2π/9)Sin(10 degrees) = Sin(10 π/180) = Sin(π/18)
Now we can substitute these values into the expression:
Sin(40°)Cos(10°) - Cos(40°)Sin(10°) = Sin(2π/9)Cos(π/18) - Cos(2π/9)Sin(π/18)
Using the angle addition formula for sine, we get:
Sin(α + β) = Sin(α)Cos(β) + Cos(α)Sin(β)
So,
Sin(2π/9)Cos(π/18) - Cos(2π/9)Sin(π/18) = Sin(2π/9 + π/18) = Sin(13π/18)
Therefore, the value of the expression Sin(40°)Cos(10°) - Cos(40°)Sin(10°) is Sin(13π/18).
First, we need to convert the given angles from degrees to radians:
Sin(40 degrees) = Sin(40 π/180) = Sin(2π/9)
Cos(10 degrees) = Cos(10 π/180) = Cos(π/18)
Cos(40 degrees) = Cos(40 π/180) = Cos(2π/9)
Sin(10 degrees) = Sin(10 π/180) = Sin(π/18)
Now we can substitute these values into the expression:
Sin(40°)Cos(10°) - Cos(40°)Sin(10°) = Sin(2π/9)Cos(π/18) - Cos(2π/9)Sin(π/18)
Using the angle addition formula for sine, we get:
Sin(α + β) = Sin(α)Cos(β) + Cos(α)Sin(β)
So,
Sin(2π/9)Cos(π/18) - Cos(2π/9)Sin(π/18) = Sin(2π/9 + π/18) = Sin(13π/18)
Therefore, the value of the expression Sin(40°)Cos(10°) - Cos(40°)Sin(10°) is Sin(13π/18).