El binomio de Newton Quiz

10 questions

Show all answers

1.

MULTIPLE CHOICE QUESTION

20 sec • 1 pt

El desarrollo del binomio
$\left(a+b\right)^2$ es:

$a^2+2ab+b^2$

$a^2+ab+b^2$

$a^2+b^2$

No se puede

2.

MULTIPLE CHOICE QUESTION

20 sec • 1 pt

El desarrollo del binomio
$\left(a+b\right)^3$ es:

$a^3+3a^2b+3ab^2+b^3$

$a^3+3ab^2+3ab+b^3$

$a^3+a^2b+ab^2+b^3$

Ninguno

3.

MULTIPLE CHOICE QUESTION

20 sec • 1 pt

En la fórmula
$t_{k+1}=\left(_k^n\right)\cdot x^{n-k}\cdot y^k$ termino general del desarrollo del binomio de Newton, donde $t_{k+1}$ respresenta

Lugar del termino buscado

El número de terminos

El coeficiente del termino

Ninguno

4.

MULTIPLE CHOICE QUESTION

20 sec • 1 pt

En la fórmula
$t_{k+1}=\left(_k^n\right)\cdot x^{n-k}\cdot y^k$ termino general del desarrollo del binomio de Newton, donde $n$ representa

Lugar del termino buscado

El número de terminos

El coeficiente del termino

Exponente del binomio

5.

MULTIPLE CHOICE QUESTION

20 sec • 1 pt

En la fórmula
$t_{k+1}=\left(_k^n\right)\cdot x^{n-k}\cdot y^k$ termino general del desarrollo del binomio de Newton, donde $x,\ y$ representa

Lugar del termino buscado

El número de terminos

Terminos del binomio

Exponente del binomio

6.

MULTIPLE CHOICE QUESTION

20 sec • 1 pt

El número de terminos del desarrollo del binomio $\left(3x+y^5\right)^{15}$ es:

$15$

$16$

$75$

$2$

7.

MULTIPLE CHOICE QUESTION

20 sec • 1 pt

El número de terminos del desarrollo del binomio $\left(a+b\right)^n$ es:

$n+1$

$n$

$n-1$

$n-k$

8.

MULTIPLE CHOICE QUESTION

20 sec • 1 pt

$1$

$0$

$2$

$n$

9.

MULTIPLE CHOICE QUESTION

20 sec • 1 pt

La propiedad de los números combinatorios de la figura es igual a:

$1$

$n$

$n+1$

$-1$

10.

MULTIPLE CHOICE QUESTION

20 sec • 1 pt

$120$

$60$

$4!$

$240$

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El binomio de Newton

El desarrollo del binomio (a+b)2\left(a+b\right)^2(a+b)2 es:

El desarrollo del binomio (a+b)3\left(a+b\right)^3(a+b)3 es:

En la fórmula tk+1=(kn)⋅xn−k⋅ykt_{k+1}=\left(_k^n\right)\cdot x^{n-k}\cdot y^ktk+1​=(kn​)⋅xn−k⋅yk termino general del desarrollo del binomio de Newton, donde tk+1t_{k+1}tk+1​ respresenta

En la fórmula tk+1=(kn)⋅xn−k⋅ykt_{k+1}=\left(_k^n\right)\cdot x^{n-k}\cdot y^ktk+1​=(kn​)⋅xn−k⋅yk termino general del desarrollo del binomio de Newton, donde nnn representa

En la fórmula tk+1=(kn)⋅xn−k⋅ykt_{k+1}=\left(_k^n\right)\cdot x^{n-k}\cdot y^ktk+1​=(kn​)⋅xn−k⋅yk termino general del desarrollo del binomio de Newton, donde x, yx,\ yx, y representa

El número de terminos del desarrollo del binomio (3x+y5)15\left(3x+y^5\right)^{15}(3x+y5)15 es:

El número de terminos del desarrollo del binomio (a+b)n\left(a+b\right)^n(a+b)n es:

La propiedad de los números combinatorios de la figura es igual a:

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El desarrollo del binomio
$\left(a+b\right)^2$ es:

El desarrollo del binomio
$\left(a+b\right)^3$ es:

En la fórmula
$t_{k+1}=\left(_k^n\right)\cdot x^{n-k}\cdot y^k$ termino general del desarrollo del binomio de Newton, donde $t_{k+1}$ respresenta

En la fórmula
$t_{k+1}=\left(_k^n\right)\cdot x^{n-k}\cdot y^k$ termino general del desarrollo del binomio de Newton, donde $n$ representa

En la fórmula
$t_{k+1}=\left(_k^n\right)\cdot x^{n-k}\cdot y^k$ termino general del desarrollo del binomio de Newton, donde $x,\ y$ representa

El número de terminos del desarrollo del binomio $\left(3x+y^5\right)^{15}$ es:

El número de terminos del desarrollo del binomio $\left(a+b\right)^n$ es: