10. 1). 2 arctg x – x + 3 = 0
2). 3x - 8x - 18x + 2 = 0
3). 2 sin (x + ) = 0,5x - 1
4). 2lg x - + 1 = 0
№ 12. 1). 2 arctg x – 3x + 2 = 0
2). 2x + 8x + 8x - 1 = 0
3). [log (x + 2)](x – 1) = 1
4). sin(x – 0,5) – x + 0,8 = 0
№ 14. 1). 2e + 3x + 1 = 0
2). 3x + 4x - 12x - 5 = 0
3). x log (x + 1) = 2
4). cos(x + 0,3) = x
№ 16. 1). arctg x - = 0
2). x - x – 1 =0
3). (x – 1) 2 = 1
4). tg x = x – 1, - /2 x![](data:image/png;base64,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) /2
№ 18. 1). 3 - 2x + 5 = 0
2). 3x + 8x + 6x - 10 = 0
3). 2x - 0,5 - 2 = 0
4). xlg(x + 1) = 1
№ 20. 1). 2arcctg x – x + 3 = 0
2). x + 4x - 8x - 17 = 0
3). 2sin (x + ) = x - 0,5
4). 2lg x - + 1 = 0
№ 22. 1). arcctg x + 2x – 1 = 0
2). 3x + 4x - 12x + 1 = 0
3). (x + 2)log (x)=1
4). sin(x + 1)=0,5x
№ 24. 1). 2e - 2x – 3 = 0
2). 3x + 4x - 12x - 5 = 0
3). xlog (x + 1) = 1
4). cos(x + 0,5) = x
№ 26. 1). arcctg (x – 1) + 2x – 3 = 0
2). x - x – 1 = 0
3). (x – 1) 2 = 1
4). tg x = x + 1, - /2 x![](data:image/png;base64,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) /2
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