5 Slides • 5 Questions

Operadores arbitrarios

2

3

Multiple Choice

Se define la operación con los números reales A y B distintos de cero:

$A\nabla B\ =\ A^B-\ B^A$

Si A=1, B=2 y C= 3, entonces el resultado de $A\nabla\left(B\nabla C\right)$ es:

1

0

2

1

3

2

4

3

4

Multiple Choice

si A*B representa la cantidad de números enteros que hay entre A y B, entonces (-3*6) - (3*-6) es igual a:

1

16

2

18

3

20

4

0

5

6

Multiple Choice

Una operación arbitraria $\Delta$ al aplicarse a cualquier número real positivo cumple que $\Delta\left(x+1\right)=x\ \Delta\left(x\right)$ y además $\Delta\left(\frac{1}{2}\right)=\ \sqrt[]{\pi}$

Hallar: $\Delta\left(\frac{5}{2}\right)$ Otra

1

$5\ \sqrt[]{\pi}$

2

$5\pi$

3

$\frac{3}{2}\ \sqrt[]{\pi}$

4

$\frac{3}{4}\ \sqrt[]{\pi}$

7

Multiple Choice

La operación $\Delta$ se aplica sobre los números enteros y cumple que $\Delta\left(x\right)=2^x$ . Entonces, el valor de $\Delta\left(x+1\right)\ -\ \Delta\left(x\right)$ es:

1

$2\Delta\left(1\right)$

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$2\Delta\left(x\right)$

3

$\Delta\left(x\right)$

4

$\Delta\left(10\right)$

8

9

Multiple Choice

Se define la operación $\int_{A^3}^{\sqrt[]{B}}\ =\ A\sqrt[4]{B\ },\ B>0$

Calcular $\int_{\int_8^4}^9$ Y

1

$3\sqrt[3]{4}$

2

$3\sqrt[3]{3}$

3

$4\sqrt[3]{4}$

4

$\sqrt[3]{4}$

10

Operadores arbitrarios

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Operadores arbitrarios

Operadores arbitrarios

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