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Factor out the greatest common factor. If the greatest common factor is $1$ , just retype the polynomial. $\newline$ $4x^3 - 6x^2$ $\newline$ ______

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Factor out a monomial

Full solution

Q. Factor out the greatest common factor. If the greatest common factor is

1

, just retype the polynomial.

\newline

4x^3 - 6x^2

\newline

______

Divide first term: Now we divide each term of the polynomial by the GCF to factor it out. For the first term, $4x^3$ divided by $2x^2$ is $2x$ . For the second term, $6x^2$ divided by $2x^2$ is $3$ . So, the polynomial $4x^3 - 6x^2$ factored by the GCF $2x^2$ is $2x^2(2x - 3)$ .

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Direction (Q. Nos.

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) This section contains

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questions. When fom

0

9

(both inclusive).

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25

f:[2, \infty) \rightarrow Y

f(x)==x^{2}-4 x+5

is both one-one and onto, if

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, then the value of

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26

f(x)=\left(\frac{4 a-7}{3}\right) x^{3}+(a-3) x^{2}+x+5

is one-one function, where

a \in[\lambda, \mu]

, then the value of

|\lambda-\mu|

\newline

27

f

be a one-one function with domain

\{x, y, z\}

\{1,2,3\}

. It is given the exactly one of the following statements is true and remaining two are false,

f(x)==x^{2}-4 x+5

0

f(x)==x^{2}-4 x+5

1

\newline

28

f(x)==x^{2}-4 x+5

2

, number of functions from

f(x)==x^{2}-4 x+5

3

f(x)==x^{2}-4 x+5

4

such that range contains exactly

3

f(x)==x^{2}-4 x+5

5

, then the value of

f(x)==x^{2}-4 x+5

6

\newline

29

f(x)==x^{2}-4 x+5

7

f(x)==x^{2}-4 x+5

8

\newline

30

f(x)==x^{2}-4 x+5

9

be a polynomial of degree

4

with leading coefficient

1

Y \in[a, \infty)

0

Y \in[a, \infty)

1

Y \in[a, \infty)

2

, then the value of

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