From Förberedande kurs i matematik 1
Exercise 4.4:1
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Exercise 4.4:2
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Exercise 4.4:3
Solve the equation
| a)
| cosx=cos 6
| b)
| \displaystyle \sin{x}=\sin{\displaystyle \frac{\pi}{5}}
|
| c)
| \displaystyle \sin{(x+40^\circ)}=\sin{65^\circ}
| d)
| \displaystyle \sin{3x}=\sin{15^\circ}
|
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Exercise 4.4:4
Determine the angles \displaystyle \,v\, in the interval \displaystyle \,0^\circ \leq v \leq 360^\circ\, which satisfy \displaystyle \ \cos{\left(2v+10^\circ\right)}=\cos{110^\circ}\,.
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Exercise 4.4:5
Solve the equation
| a)
| \displaystyle \sin{3x}=\sin{x}
| b)
| \displaystyle \tan{x}=\tan{4x}
|
| c)
| \displaystyle \cos{5x}=\cos(x+\pi/5)
|
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Exercise 4.4:6
Solve the equation
| a)
| \displaystyle \sin x\cdot \cos 3x = 2\sin x
| b)
| \displaystyle \sqrt{2}\sin{x}\cos{x}=\cos{x}
|
| c)
| \displaystyle \sin 2x = -\sin x
|
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Exercise 4.4:7
Solve the equation
| a)
| \displaystyle 2\sin^2{x}+\sin{x}=1
| b)
| \displaystyle 2\sin^2{x}-3\cos{x}=0
|
| c)
| \displaystyle \cos{3x}=\sin{4x}
|
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Exercise 4.4:8
Solve the equation
| a)
| \displaystyle \sin{2x}=\sqrt{2}\cos{x}
| b)
| \displaystyle \sin{x}=\sqrt{3}\cos{x}
|
| c)
| \displaystyle \displaystyle \frac{1}{\cos^2{x}}=1-\tan{x}
|
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