Integrales

Descrição

Identificar el método de integración
Ceci Mendoza
FlashCards por Ceci Mendoza, atualizado more than 1 year ago
Ceci Mendoza
Criado por Ceci Mendoza mais de 6 anos atrás
49
1

Resumo de Recurso

Questão Responda
Basic Integral
Basic Integral
Basic Integral
Basic Integral
Basic Integral
Basic Integral
Basic Integral
Basic Integral
Basic Integral
Basic Integral
Basic Integral
Basic Integral
Basic Integral
u substitution
algebraic sub
u substitution
u substitution
u substitution
algebraic sub
algebraic sub
u substitution
u substitution
u substitution
u substitution
u substitution
Basic Integral
u substitution
u substitution
u substitution
u substitution
by parts
algebraic sub
u substitution
algebraic sub
algebraic sub
algebraic sub
by parts
u substitution
u substitution
by parts
u substitution
by parts
by parts
algebraic sub
by parts
by parts
by parts
algebraic sub
u substitution
u substitution
Basic Integral
by parts =90u^2
algebraic sub
u substitution
u substitution (caso con 2 "u")
by parts
by parts
by parts
by parts
by parts
by parts
algebraic sub
u substitution
u substitution
u substitution
u substitution
u substitution
u substitution
Basic Integral
Basic Integral
Basic Integral
Basic Integral
Basic Integral
Basic Integral
Basic Integral
Basic Integral
Basic Integral
Basic Integral
Basic Integral
Basic Integral
algebraic sub =1.34933 u^2
algebraic sub =0.3214 u^2
algebraic sub
algebraic sub
algebraic sub
algebraic sub
algebraic sub
algebraic sub
algebraic sub
algebraic sub
algebraic sub
algebraic sub
u substitution
u substitution
u substitution
trigonometric powers
trigonometric powers
trigonometric powers
trigonometric powers (la otra respuesta con "cos" y signos contrarios)
trigonometric powers (even powers)
trigonometric powers (even powers)
trigonometric powers (even powers)
trigonometric powers = −0.02864 u^2
trigonometric powers
trigonometric powers (even powers)
trigonometric powers
u substitution
u substitution
u substitution
u substitution
u substitution
u substitution
u substitution
u substitution
u substitution
u substitution
u substitution (special case)
u substitution
u substitution
u substitution
u substitution
u substitution
u substitution
u substitution
u substitution
u substitution
u substitution
u substitution
u substitution
u substitution
u substitution
u substitution
u substitution
u substitution
u substitution
u substitution
u substitution
u substitution
trigonometric powers
trigonometric powers
trigonometric powers = 0.53333 u^2
trigonometric powers
trigonometric powers
trigonometric powers π/4 = 0.785398 u^2
trigonometric powers
trigonometric powers
trigonometric powers
trigonometric powers
trigonometric powers π/16= 0.1963 u^2
trigonometric powers π/8= 0.3926 u^2
partial fractions A= 1/2 B= -1/10 C= 1/5
partial fractions A= -1/5 B= 1/5
partial fractions A= -1 B= 2 C= 3
partial fractions
partial fractions A= 2 B= -1
partial fractions A= 1/2 B= -1/2 = -0.896 u^2
partial fractions A= -1/2 B= 1/2
partial fractions A= 1/3 B= -2/3
partial fractions A= -2 B= 5
partial fractions A= 5 B= -2
partial fractions A= 1/6 B= -1/6
partial fractions A= 1/10 B= -1/10
partial fractions A= 5/8 B= 3/8
partial fractions A= 1/15 B= 3/5 C= -2/3
partial fractions A= -1/2 B= 1/2
partial fractions A= -1/3 B= 1/3
partial fractions A= 2/3 B= -1/3 [2/3ln(x+2) -1/6ln(2x+1)+c]
partial fractions A= 12/7 B= -5/7
partial fractions A= 6 B= -3/2 C= -7/2
partial fractions A= -1/4 B= 19/8 C= 23/8
partial fractions A= -1/4 B= 2 C= -7/4

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