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Similar to Biseccion (20)
Biseccion
- 1. 1. Biseccion
a) f(x) = 1/4x^3+5x-6 {1 1,3}
b) f(x) = 1/4x^3+5x-6 {1 1,8}
c) f(x) = 1/5x^3+5x-6 {1 1.2}
d) f(x) = 1/5x^5+5x-6 {1 1.2}
e) f(x) = 1/3x^5+3x-5 {1 1.5}
f) f(x) = 1/3x^5+3x^3 -6 {1 1.5}
g) f(x) = 1/3x^5+3x^3 -6 {1 1.5}
2. secante
a) f(x) = 1/3x^5+3x^3 -6 [1 3]
b) f(x) = 1/3x^5+3x^3 -6 [1 8]
c) f(x) = 1/3x^4+3x^3 -6 [1 2]
d) f(x) = 1/7x^2+4x^3 – 4 [ 2.5 3 ]
e) f(x) = 1/3x^4+3x^3 -6 [1 5]
f) f(x) = 12x^4+5x^3 -6 [1 5]
g) f(x) = 12x^4+5x^3 -6 [1 3]
h) f(x) = 10x^4+7x^3 -3 [1 3]
3. newton
a) f(x) = 5x^4+7x^3 -3 [ 1 ]
b) f(x) = 6x^3+6x-4x^2 – 4 [ 2 ]
c) f(x) = 6x^3+6x-4x^2 – 4 [ 3 ]
d) f(x) = 6x^3+6x-4x^2 – 4 [-2 ]
e) f(x) = 1/7x^2+4x^3 – 4 [ 3 ]
f) f(x) = 1/7x^2+4x^3 – 4 [ 2 ]
g) f(x) = 1/7x^2+4x^3 – 4 [ 2,5 ]
h) f(x) = 1/5x^2+5x^3 – 5 [ 2.5 ]
i) f(x) = 1/5x^2+5x^3 – 5 [ 2 ]
4. Metodo de Muller