График функции
0 -2000 -1500 -1000 -500 500 1000 1500 2000 2 -2
Область определения функции
Точки, в которых функция точно неопределена:x 1 = 1.5707963267949 x_{1} = 1.5707963267949 x 1 = 1.5707963267949 x 2 = 4.71238898038469 x_{2} = 4.71238898038469 x 2 = 4.71238898038469
Точки пересечения с осью координат X
График функции пересекает ось X при f = 0cos ( x ) ∣ cos ( x ) ∣ = 0 \frac{\cos{\left (x \right )}}{\left|{\cos{\left (x \right )}}\right|} = 0 ∣ cos ( x ) ∣ cos ( x ) = 0 Решаем это уравнение Численное решение x 1 = − 54.9778714378 x_{1} = -54.9778714378 x 1 = − 54.9778714378 x 2 = 39.2699081699 x_{2} = 39.2699081699 x 2 = 39.2699081699 x 3 = 51.8362787842 x_{3} = 51.8362787842 x 3 = 51.8362787842 x 4 = 86.3937979737 x_{4} = 86.3937979737 x 4 = 86.3937979737 x 5 = − 17.2787595947 x_{5} = -17.2787595947 x 5 = − 17.2787595947 x 6 = 45.5530934771 x_{6} = 45.5530934771 x 6 = 45.5530934771 x 7 = 61.261056745 x_{7} = 61.261056745 x 7 = 61.261056745 x 8 = 67.5442420522 x_{8} = 67.5442420522 x 8 = 67.5442420522 x 9 = − 70.6858347058 x_{9} = -70.6858347058 x 9 = − 70.6858347058 x 10 = − 89.5353906273 x_{10} = -89.5353906273 x 10 = − 89.5353906273 x 11 = 92.6769832809 x_{11} = 92.6769832809 x 11 = 92.6769832809 x 12 = 76.9690200129 x_{12} = 76.9690200129 x 12 = 76.9690200129 x 13 = − 32.9867228627 x_{13} = -32.9867228627 x 13 = − 32.9867228627 x 14 = 17.2787595947 x_{14} = 17.2787595947 x 14 = 17.2787595947 x 15 = − 48.6946861306 x_{15} = -48.6946861306 x 15 = − 48.6946861306 x 16 = − 80.1106126665 x_{16} = -80.1106126665 x 16 = − 80.1106126665 x 17 = − 42.4115008235 x_{17} = -42.4115008235 x 17 = − 42.4115008235 x 18 = − 58.1194640914 x_{18} = -58.1194640914 x 18 = − 58.1194640914 x 19 = 1.57079632679 x_{19} = 1.57079632679 x 19 = 1.57079632679 x 20 = − 95.8185759345 x_{20} = -95.8185759345 x 20 = − 95.8185759345 x 21 = 95.8185759345 x_{21} = 95.8185759345 x 21 = 95.8185759345 x 22 = − 36.1283155163 x_{22} = -36.1283155163 x 22 = − 36.1283155163 x 23 = − 64.4026493986 x_{23} = -64.4026493986 x 23 = − 64.4026493986 x 24 = 36.1283155163 x_{24} = 36.1283155163 x 24 = 36.1283155163 x 25 = − 61.261056745 x_{25} = -61.261056745 x 25 = − 61.261056745 x 26 = − 92.6769832809 x_{26} = -92.6769832809 x 26 = − 92.6769832809 x 27 = 32.9867228627 x_{27} = 32.9867228627 x 27 = 32.9867228627 x 28 = − 14.1371669412 x_{28} = -14.1371669412 x 28 = − 14.1371669412 x 29 = 80.1106126665 x_{29} = 80.1106126665 x 29 = 80.1106126665 x 30 = 4.71238898038 x_{30} = 4.71238898038 x 30 = 4.71238898038 x 31 = 10.9955742876 x_{31} = 10.9955742876 x 31 = 10.9955742876 x 32 = 7.85398163397 x_{32} = 7.85398163397 x 32 = 7.85398163397 x 33 = 23.5619449019 x_{33} = 23.5619449019 x 33 = 23.5619449019 x 34 = − 39.2699081699 x_{34} = -39.2699081699 x 34 = − 39.2699081699 x 35 = 64.4026493986 x_{35} = 64.4026493986 x 35 = 64.4026493986 x 36 = − 387.986692718 x_{36} = -387.986692718 x 36 = − 387.986692718 x 37 = − 73.8274273594 x_{37} = -73.8274273594 x 37 = − 73.8274273594 x 38 = 20.4203522483 x_{38} = 20.4203522483 x 38 = 20.4203522483 x 39 = − 26.7035375555 x_{39} = -26.7035375555 x 39 = − 26.7035375555 x 40 = − 83.2522053201 x_{40} = -83.2522053201 x 40 = − 83.2522053201 x 41 = − 98.9601685881 x_{41} = -98.9601685881 x 41 = − 98.9601685881 x 42 = 48.6946861306 x_{42} = 48.6946861306 x 42 = 48.6946861306 x 43 = 14.1371669412 x_{43} = 14.1371669412 x 43 = 14.1371669412 x 44 = 98.9601685881 x_{44} = 98.9601685881 x 44 = 98.9601685881 x 45 = − 45.5530934771 x_{45} = -45.5530934771 x 45 = − 45.5530934771 x 46 = − 51.8362787842 x_{46} = -51.8362787842 x 46 = − 51.8362787842 x 47 = − 67.5442420522 x_{47} = -67.5442420522 x 47 = − 67.5442420522 x 48 = 54.9778714378 x_{48} = 54.9778714378 x 48 = 54.9778714378 x 49 = 26.7035375555 x_{49} = 26.7035375555 x 49 = 26.7035375555 x 50 = − 86.3937979737 x_{50} = -86.3937979737 x 50 = − 86.3937979737 x 51 = − 20.4203522483 x_{51} = -20.4203522483 x 51 = − 20.4203522483 x 52 = − 168.075206967 x_{52} = -168.075206967 x 52 = − 168.075206967 x 53 = − 4.71238898038 x_{53} = -4.71238898038 x 53 = − 4.71238898038 x 54 = − 76.9690200129 x_{54} = -76.9690200129 x 54 = − 76.9690200129 x 55 = 89.5353906273 x_{55} = 89.5353906273 x 55 = 89.5353906273 x 56 = − 10.9955742876 x_{56} = -10.9955742876 x 56 = − 10.9955742876 x 57 = − 2266.65909957 x_{57} = -2266.65909957 x 57 = − 2266.65909957 x 58 = − 7.85398163397 x_{58} = -7.85398163397 x 58 = − 7.85398163397 x 59 = − 1.57079632679 x_{59} = -1.57079632679 x 59 = − 1.57079632679 x 60 = − 23.5619449019 x_{60} = -23.5619449019 x 60 = − 23.5619449019 x 61 = 73.8274273594 x_{61} = 73.8274273594 x 61 = 73.8274273594 x 62 = 70.6858347058 x_{62} = 70.6858347058 x 62 = 70.6858347058 x 63 = 29.8451302091 x_{63} = 29.8451302091 x 63 = 29.8451302091 x 64 = 42.4115008235 x_{64} = 42.4115008235 x 64 = 42.4115008235 x 65 = 83.2522053201 x_{65} = 83.2522053201 x 65 = 83.2522053201 x 66 = 58.1194640914 x_{66} = 58.1194640914 x 66 = 58.1194640914 x 67 = − 29.8451302091 x_{67} = -29.8451302091 x 67 = − 29.8451302091
Точки пересечения с осью координат Y
График пересекает ось Y, когда x равняется 0:cos ( 0 ) ∣ cos ( 0 ) ∣ \frac{\cos{\left (0 \right )}}{\left|{\cos{\left (0 \right )}}\right|} ∣ cos ( 0 ) ∣ cos ( 0 ) f ( 0 ) = 1 f{\left (0 \right )} = 1 f ( 0 ) = 1 (0, 1)
Экстремумы функции
Для того, чтобы найти экстремумы, нужно решить уравнениеd d x f ( x ) = 0 \frac{d}{d x} f{\left (x \right )} = 0 d x d f ( x ) = 0 d d x f ( x ) = \frac{d}{d x} f{\left (x \right )} = d x d f ( x ) = Первая производная − sin ( x ) ∣ cos ( x ) ∣ + sign ( cos ( x ) ) cos ( x ) sin ( x ) = 0 - \frac{\sin{\left (x \right )}}{\left|{\cos{\left (x \right )}}\right|} + \frac{\operatorname{sign}{\left (\cos{\left (x \right )} \right )}}{\cos{\left (x \right )}} \sin{\left (x \right )} = 0 − ∣ cos ( x ) ∣ sin ( x ) + cos ( x ) sign ( cos ( x ) ) sin ( x ) = 0 Решаем это уравнение x 1 = π x_{1} = \pi x 1 = π (pi, -1) Интервалы возрастания и убывания функции:
Вертикальные асимптоты
Есть:x 1 = 1.5707963267949 x_{1} = 1.5707963267949 x 1 = 1.5707963267949 x 2 = 4.71238898038469 x_{2} = 4.71238898038469 x 2 = 4.71238898038469
Горизонтальные асимптоты
Горизонтальные асимптоты найдём с помощью пределов данной функции при x->+oo и x->-oolim x → − ∞ ( cos ( x ) ∣ cos ( x ) ∣ ) = ⟨ − 1 , 1 ⟩ ∣ ⟨ − 1 , 1 ⟩ ∣ \lim_{x \to -\infty}\left(\frac{\cos{\left (x \right )}}{\left|{\cos{\left (x \right )}}\right|}\right) = \frac{\langle -1, 1\rangle}{\left|{\langle -1, 1\rangle}\right|} x → − ∞ lim ( ∣ cos ( x ) ∣ cos ( x ) ) = ∣ ⟨ − 1 , 1 ⟩ ∣ ⟨ − 1 , 1 ⟩ Возьмём предел y = ⟨ − 1 , 1 ⟩ ∣ ⟨ − 1 , 1 ⟩ ∣ y = \frac{\langle -1, 1\rangle}{\left|{\langle -1, 1\rangle}\right|} y = ∣ ⟨ − 1 , 1 ⟩ ∣ ⟨ − 1 , 1 ⟩ lim x → ∞ ( cos ( x ) ∣ cos ( x ) ∣ ) = ⟨ − 1 , 1 ⟩ ∣ ⟨ − 1 , 1 ⟩ ∣ \lim_{x \to \infty}\left(\frac{\cos{\left (x \right )}}{\left|{\cos{\left (x \right )}}\right|}\right) = \frac{\langle -1, 1\rangle}{\left|{\langle -1, 1\rangle}\right|} x → ∞ lim ( ∣ cos ( x ) ∣ cos ( x ) ) = ∣ ⟨ − 1 , 1 ⟩ ∣ ⟨ − 1 , 1 ⟩ Возьмём предел y = ⟨ − 1 , 1 ⟩ ∣ ⟨ − 1 , 1 ⟩ ∣ y = \frac{\langle -1, 1\rangle}{\left|{\langle -1, 1\rangle}\right|} y = ∣ ⟨ − 1 , 1 ⟩ ∣ ⟨ − 1 , 1 ⟩
Наклонные асимптоты
Наклонную асимптоту можно найти, подсчитав предел функции cos(x)/Abs(cos(x)), делённой на x при x->+oo и x ->-oolim x → − ∞ ( cos ( x ) x ∣ cos ( x ) ∣ ) = 0 \lim_{x \to -\infty}\left(\frac{\cos{\left (x \right )}}{x \left|{\cos{\left (x \right )}}\right|}\right) = 0 x → − ∞ lim ( x ∣ cos ( x ) ∣ cos ( x ) ) = 0 Возьмём предел lim x → ∞ ( cos ( x ) x ∣ cos ( x ) ∣ ) = 0 \lim_{x \to \infty}\left(\frac{\cos{\left (x \right )}}{x \left|{\cos{\left (x \right )}}\right|}\right) = 0 x → ∞ lim ( x ∣ cos ( x ) ∣ cos ( x ) ) = 0 Возьмём предел
Чётность и нечётность функции
Проверим функци чётна или нечётна с помощью соотношений f = f(-x) и f = -f(-x).cos ( x ) ∣ cos ( x ) ∣ = cos ( x ) ∣ cos ( x ) ∣ \frac{\cos{\left (x \right )}}{\left|{\cos{\left (x \right )}}\right|} = \frac{\cos{\left (x \right )}}{\left|{\cos{\left (x \right )}}\right|} ∣ cos ( x ) ∣ cos ( x ) = ∣ cos ( x ) ∣ cos ( x ) cos ( x ) ∣ cos ( x ) ∣ = − cos ( x ) ∣ cos ( x ) ∣ \frac{\cos{\left (x \right )}}{\left|{\cos{\left (x \right )}}\right|} = - \frac{\cos{\left (x \right )}}{\left|{\cos{\left (x \right )}}\right|} ∣ cos ( x ) ∣ cos ( x ) = − ∣ cos ( x ) ∣ cos ( x ) 