Para hallar los extremos hay que resolver la ecuación
$$\frac{d}{d x} f{\left(x \right)} = 0$$
(la derivada es igual a cero),
y las raíces de esta ecuación serán los extremos de esta función:
$$\frac{d}{d x} f{\left(x \right)} = $$
primera derivada$$\frac{2 \operatorname{sign}{\left(2 x + 3 \right)}}{2 x + 3} - \frac{2 \left|{2 x + 3}\right|}{\left(2 x + 3\right)^{2}} = 0$$
Resolvermos esta ecuaciónRaíces de esta ecuación
$$x_{1} = -8$$
$$x_{2} = 60$$
$$x_{3} = 0$$
$$x_{4} = 16$$
$$x_{5} = 88$$
$$x_{6} = 62$$
$$x_{7} = 58$$
$$x_{8} = -88$$
$$x_{9} = -44$$
$$x_{10} = -80$$
$$x_{11} = 48$$
$$x_{12} = 84$$
$$x_{13} = -24$$
$$x_{14} = -98$$
$$x_{15} = 72$$
$$x_{16} = 42$$
$$x_{17} = 22$$
$$x_{18} = 82$$
$$x_{19} = -18$$
$$x_{20} = -58$$
$$x_{21} = -70$$
$$x_{22} = 24$$
$$x_{23} = -6$$
$$x_{24} = 92$$
$$x_{25} = 18$$
$$x_{26} = 94$$
$$x_{27} = 10$$
$$x_{28} = -22$$
$$x_{29} = -26$$
$$x_{30} = -50$$
$$x_{31} = 46$$
$$x_{32} = 28$$
$$x_{33} = 26$$
$$x_{34} = 70$$
$$x_{35} = 66$$
$$x_{36} = -92$$
$$x_{37} = 40$$
$$x_{38} = -78$$
$$x_{39} = 64$$
$$x_{40} = -76$$
$$x_{41} = 54$$
$$x_{42} = -32$$
$$x_{43} = 98$$
$$x_{44} = -10$$
$$x_{45} = 86$$
$$x_{46} = -34$$
$$x_{47} = -12$$
$$x_{48} = 14$$
$$x_{49} = -16$$
$$x_{50} = -60$$
$$x_{51} = -94$$
$$x_{52} = -48$$
$$x_{53} = 6$$
$$x_{54} = -66$$
$$x_{55} = -74$$
$$x_{56} = -96$$
$$x_{57} = 100$$
$$x_{58} = 32$$
$$x_{59} = -40$$
$$x_{60} = -38$$
$$x_{61} = -100$$
$$x_{62} = 74$$
$$x_{63} = -62$$
$$x_{64} = -82$$
$$x_{65} = -56$$
$$x_{66} = -64$$
$$x_{67} = 78$$
$$x_{68} = 76$$
$$x_{69} = 8$$
$$x_{70} = 38$$
$$x_{71} = 2$$
$$x_{72} = -46$$
$$x_{73} = -28$$
$$x_{74} = -36$$
$$x_{75} = 34$$
$$x_{76} = -52$$
$$x_{77} = 90$$
$$x_{78} = -2$$
$$x_{79} = 68$$
$$x_{80} = 36$$
$$x_{81} = 56$$
$$x_{82} = 12$$
$$x_{83} = 4$$
$$x_{84} = -90$$
$$x_{85} = -86$$
$$x_{86} = 80$$
$$x_{87} = 52$$
$$x_{88} = 50$$
$$x_{89} = 44$$
$$x_{90} = -72$$
$$x_{91} = -20$$
$$x_{92} = 96$$
$$x_{93} = -14$$
$$x_{94} = -30$$
$$x_{95} = -4$$
$$x_{96} = -42$$
$$x_{97} = 20$$
$$x_{98} = -68$$
$$x_{99} = 30$$
$$x_{100} = -54$$
$$x_{101} = -84$$
Signos de extremos en los puntos:
(-8, -1)
(60, 1)
(0, 1)
(16, 1)
(88, 1)
(62, 1)
(58, 1)
(-88, -1)
(-44, -1)
(-80, -1)
(48, 1)
(84, 1)
(-24, -1)
(-98, -1)
(72, 1)
(42, 1)
(22, 1)
(82, 1)
(-18, -1)
(-58, -1)
(-70, -1)
(24, 1)
(-6, -1)
(92, 1)
(18, 1)
(94, 1)
(10, 1)
(-22, -1)
(-26, -1)
(-50, -1)
(46, 1)
(28, 1)
(26, 1)
(70, 1)
(66, 1)
(-92, -1)
(40, 1)
(-78, -1)
(64, 1)
(-76, -1)
(54, 1)
(-32, -1)
(98, 1)
(-10, -1)
(86, 1)
(-34, -1)
(-12, -1)
(14, 1)
(-16, -1)
(-60, -1)
(-94, -1)
(-48, -1)
(6, 1)
(-66, -1)
(-74, -1)
(-96, -1)
(100, 1)
(32, 1)
(-40, -1)
(-38, -1)
(-100, -1)
(74, 1)
(-62, -1)
(-82, -1)
(-56, -1)
(-64, -1)
(78, 1)
(76, 1)
(8, 1)
(38, 1)
(2, 1)
(-46, -1)
(-28, -1)
(-36, -1)
(34, 1)
(-52, -1)
(90, 1)
(-2, -1)
(68, 1)
(36, 1)
(56, 1)
(12, 1)
(4, 1)
(-90, -1)
(-86, -1)
(80, 1)
(52, 1)
(50, 1)
(44, 1)
(-72, -1)
(-20, -1)
(96, 1)
(-14, -1)
(-30, -1)
(-4, -1)
(-42, -1)
(20, 1)
(-68, -1)
(30, 1)
(-54, -1)
(-84, -1)
Intervalos de crecimiento y decrecimiento de la función:Hallemos los intervalos donde la función crece y decrece y también los puntos mínimos y máximos de la función, para lo cual miramos cómo se comporta la función en los extremos con desviación mínima del extremo:
La función no tiene puntos mínimos
Puntos máximos de la función:
$$x_{101} = -100$$
$$x_{101} = -82$$
$$x_{101} = 36$$
$$x_{101} = 30$$
Decrece en los intervalos
$$\left(-\infty, -100\right]$$
Crece en los intervalos
$$\left[36, \infty\right)$$