| Ή ο/ο
| f(x) = 0
| [a, b]
|
|
|  = 0
| 0; p
|
|
| 1,4x 2cos(x) = 0
| -0,5π; 0,5π
|
|
| sin(x) 0,5 = 0
| -π; π
|
|
| cos(x) + 1/(x 2) = 0
| -3; 0
|
| Ή ο/ο
| f(x) = 0
| [a, b]
|
|
| sin(x) ln(x 1) = 0
| 1,6; 4
|
|
| sin(x + 0,2) 1/(x + 2) = 0
| 0; 2
|
|
| tg(0,25px) + ln(x + 1) = 0
| 4; 6
|
|
| 2sin(x)  = 0
| 0; 1,5
|
|
| cos(x) + 1,5 (x + 1,5)2 = 0
| 0; 2
|
|
| 2sin(x) + 1,5 (x + 2,5)2 = 0
| -4; 0
|
|
| 2cos(x) +  = 0
| -2; 1
|
|
| arcsin(0,25x) 1/(x 0,5) = 0
| 0,6; 3
|
|
| cos(x) lg(x + 1,5) = 0
| 0; 2
|
|
| sin(x) + 1,5  = 0
| 0; 3
|
|
|   = 0
| 0; 2
|
|
| tg(0,25πx)  = 0
| 0; 1,5
|
|
|  = 0
| -2; 0
|
|
| arccos(0,25x)  = 0
| 0; 2
|
|
| cos(x + 0,5) + 1  = 0
| 0; 4
|
|
| cos(x + 1,5) + (x 2,3)2 1,5 = 0
| 3; 5
|
|
| 3,5sin(x) lg(x + 3,5) = 0
| 2; 4
|
|
| arcsin(0,25×x) + 0,7× = 0
| 1; 3
|
|
| arccos(0,2x) 2,5 +(x + 1,5)2 = 0
| -1,5; 1,5
|
|
| arcctg(x + 0,5) - lg(x + 3,5) = 0
| 0; 2
|
|
| arctg(x 1,2) +  = 0
| -2; 2
|
|
| tg(x) + ln(x + 1,3) = 0
| -1; 1
|
|
| arcsin(x/3) + 1,5 (x 0,5)2 = 0
| 0; 3
|
|
| arccos(0,2x) 2,3 / (x 1,5)2 = 0
| -1; 1
|
|
| arctg(x) + 0,75 (x 0,5)2 = 0
| 1; 3
|
|
| cos(x 0,5) 0,5× = 0
| -4; -2
|
| Ή ο/ο
| f(x) = 0
| [a, b]
|
|
| xsin(x + 0,6) 1,4 = 0
| 0; 2
|
|
| ctg(px / 3) 1,25x= 0
| -3; -1
|
|
| arcsin(0,5x) + 1,5  = 0
| 0; 2
|
|
| 1,7x 3sin(x) = 0
| 0; 2
|
|
| Sin(x 0,5) + 1 / (x 2) = 0
| -3; 0
|
|
| 2sin(x) ln(x + 1,6) = 0
| 1; 5
|
|
| ctg(px/4)  = 0
| -3,6; -0,6
|
|
| arcctg(x) + 0,8 (x 2,1)2 = 0
| -1; 2
|
|
| 2sin(0,5x)  = 0
| 0; 3
|
|
| cos(x + 1) (x + 0,4)2= 0
| -1; 3
|
|
| arcctg(x) 0,5  = 0
| -2; 2
|
|
| arcctg(x 1) 1 / ln(x + 2) = 0
| 0; 5
|
|
| ln(x + 1,5) arcctg(x 1) + 1 = 0
| 0; 3
|
|
| 0,5 + arcsin(x / 3) (x + 0,5)3 =0
| -2; 2
|
|
|  lg(x + 1) = 0
| 0; 3
|
|
|  1 / lg(x + 2) = 0
| 0; 2
|
|
| 1/(x 2) +  2 = 0
| -3; 0
|
|
| 2sin(x 1)  = 0
| 0; 3
|
|
| arcsin(x / 3) + ln(x 1) = 0
| 1,5; 3
|
|
| (x + 3) / (x 1) ln(x + 2) = 0
| -5; 0
|