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2 years ago

5

Someone PLZ tell me how to solve these cause I honestly don’t understand at ALL!!! Plz respond ASAP!!!!

1 answer:

adell [148]2 years ago

7 0

First find all possible rational roots. To do this, find all the factors of the lowest order coefficient and the highest order coefficient. For #1, the highest order coefficient is 1 because the x^3 doesn't have a number in front of it. The lowest order coefficient is 30.

Here are all the factors:

Factors of 1 are: 1

Factors of 30 are: 1, 2, 3, 5, 6, 10, 15, 30

Now divide each factor of 30 (positive and negative), and divide them by each factor of 1.

All possible rational roots are:

-1, 1, -2, 2, -3, 3, -5, 5, -5, 6, -10, 10, -15, 15, -30, 30

Now we perform synthetic division like you have started to do. Try dividing the polynomial by each possible root. If the result has a remainder, that possible root does NOT work. Try another possible root. If there is not a remainder, you have found one of the roots.

For example, when dividing x^3 - 4x^2 -11x + 30 by the possible root 2, we get x^2 - 2x - 15 without a remainder. That means 2 is a root. From here we can factor the result to (x-5)(x+3).

So the roots for #1 are x = -3, 2, and 5.

Let me know if you need help with the others :)

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5w-8x+20y+6z<br> Term: <br> Coefficient:

MissTica

$\quad \huge \quad \quad \boxed{ \tt \:Answer }$

$\sf{5w\rightarrow coefficient = 5}$

$\sf{-8x\rightarrow coefficient = -8}$

$\sf{20y\rightarrow coefficient = 20}$

$\sf{6z\rightarrow coefficient = 6}$

____________________________________

$\large \tt Solution \: :$

Term refers to each variable or constant separated by a mathematical operator.

Coefficient refers to the numberic part of variable or a constant number present in an expression.

$\qquad \tt \rightarrow \: 12a - 10b + 6$

$\large\textsf{Terms :}$

$\texttt{5w }$

$\texttt{coefficient = 5}$

$\texttt{-8x}$

$\texttt{coefficient = -8 }$

$\texttt{20y}$

$\texttt{coefficient = 20}$

$\texttt{6z}$

$\texttt{coefficient = 6}$

Answered by : ❝ AǫᴜᴀWɪᴢ ❞

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Step-by-step explanation:

Here, the given expressions are:

A) $(1.2)^{2}$

Solving this, we get

$(1.2)^{2} = 1.2 \times 1.2 = 1.44$

⇒ $(1.2)^{2} = 1.44$

B) $2^ 3+17-(3\times 4)$

Now, solving this, we get

$2^ 3+17-(3\times 4) = (2 \times 2 \times2) + (17 -12)\\=8 + 5 = 13$

⇒ $2^ 3+17-(3\times 4) = 13$

C) $\frac{(9)^2}{(3)^3}$

Simplifying this, we get

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⇒ $\frac{(9)^2}{(3)^3} = 3$

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