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3 years ago

Simplify 3.31 l : 900 ml

Mathematics

2 answers:

Deffense [45]3 years ago

4 0

Hi,
3.31l=3310 ml
3310 ml:900ml
331ml:90ml,
Hope it helps you.

Paul [167]3 years ago

3 0

We can take the ratio of two same quantities.

Quantities must have the volume in the same units.

We know 1 liter is equal to 1000 milliliters

We have here 3.31 liters

We need to multiply this by 1000 to convert it to milliliters.

We get

3.31 × 1000 = 3310 milliliters

3.31 L : 900 ml

= 3310 : 900

Dividing by 10 we get

= 331 : 9

Now the factors of 9 are 3 × 3.

But 331 is not divisible by 3

Hence this ratio cannot be simplified further.

The simplified answer is 331 : 9

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satela [25.4K]

Answer:

<h3><u>Solution</u><u>:</u><u>-</u></h3>

First write the given equation

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$\qquad{:}\longrightarrow$ $\sf \dfrac {5 (x-2)-1 (x+3)}{(x+3)(x-2)}=1$

$\qquad{:}\longrightarrow$ $\sf \dfrac {5x-10-x }{x^2-6x-6} =1$

use cross multiplication method

$\qquad{:}\longrightarrow$ $\sf 5x-x-10=x^2-6x-6$

$\qquad{:}\longrightarrow$ $\sf x^2-6x-6=4x-10$

$\qquad{:}\longrightarrow$ $\sf x^2-6x-4x-6+10=0$

$\qquad{:}\longrightarrow$ $\sf x^2-10x+4=0$

use quadratic formula

$\qquad{:}\longrightarrow$ $\sf x=\dfrac {-b\underline{+}\sqrt {b^2-4ac}}{2a}$

$\qquad{:}\longrightarrow$ $\sf x=\dfrac {10\underline{+}\sqrt {(-10)^2-4×1×4}}{2×1}$

$\qquad{:}\longrightarrow$ $\sf x=\dfrac {10\underline{+}\sqrt{100-16}}{2}$

$\qquad{:}\longrightarrow$ $\sf x=\dfrac {10\underline{+}\sqrt {84}}{2}$

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3 years ago

Find the missing angle measure

TiliK225 [7]

Answer:

1) $122$ °

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Step-by-step explanation:

As these two angles are supplementary (They add together to equal 180°) we can setup the equation and solve for x.

$58+x=180\\\\x=180-58\\\\x=122$

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4 years ago

Which reason justifies step 2 in the proof, if it all the pictures are in this question I’ll make another question.

IRISSAK [1]

Could you have a bit more clarification so there shall be a better understanding toreares your questions

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4 years ago

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madam [21]

Answer:

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3 0

3 years ago

Will someone please help with this please ASAP

geniusboy [140]

A nice, interesting question. We have to be known to a equation called as the Circle equation. It is given by the formula of:

$\boxed{\mathbf{(x - a)^2 + (y - b)^2 = r^2}}$

That is the circle equation with a representation of the variable "a" and variable "b" as the points for the circle's center and the variable of "r" is representing the radius of the circle.

We are told to convert the given equation expression into a typical standard format of circle equation. This will mean we can easily deduce the values of the following variables and/or the points of the circle including the radius of the circle by our standard circle equation via conversion of this expression. So, let us start by interpreting this through equation editor for mathematical expression LaTeX, for a clearer view and better understanding.

$\boxed{\mathbf{Given \: \: Equation: x^2 + y^2 - 4x + 6y + 9 = 0}}$

Firstly, shifting the real numbered values or the loose number, in this case it is "9", to the right hand side, since we want an actual numerical value and the radius of circle without complicating and stressing much by using quadratic equations. So:

$\mathbf{x^2 - 4x + 6y + y^2 = - 9}$

Group up the variables of "x" and "y" for easier simplification.

$\mathbf{\Big(x^2 + 4x \Big) + \Big(y^2 + 6y \Big) = - 9}$

Here comes the catch of applying logical re-squaring of variables. We have to convert the variable of "x" into a "form of square". We can do this by adding up some value on the grouped variables as separately for "x" and "y" respectively. And add the value of "4" on the right hand side as per the square conversion. So:

$\mathbf{\Big(x^2 - 4x + 4 \Big) + \Big(y^2 + 6y \Big) = - 9 + 4}$

We can see that; our grouped variable of "x" is exhibiting the square of expression as "(x - 2)^2" which gives up the same expression when we square "(x - 2)^2". Put this square form back into our current Expressional Equation.

$\mathbf{(x - 2)^2 + \Big(y^2 + 6y \Big) = - 9 + 4}$

Similarly, convert the grouped expression for the variable "y" into a square form by adding the value "9" to grouped expression of variable "y" and adding the same value on the right hand side of the Current Equation, as per the square conversion.

$\mathbf{(x - 2)^2 + \Big(y^2 + 6y + 9 \Big) = - 9 + 4 + 9}$

Again; We can see that; our grouped variable of "y" is exhibiting the square of expression as "(y + 3)^2" which gives up the same expression when we square "(y + 3)^2". Put this square form back into our current Expressional Equation.

$\mathbf{(x - 2)^2 + (y + 3)^2 = - 9 + 13}$

$\mathbf{(x - 2)^2 + (y + 3)^2 = 4}$

Re-configure this current Expressional Equational Variable form into the current standard format of Circle Equation. Here, "(y - b)^2" is to be shown and our currently obtained Equation does not exhibit that. So, we do just one last thing. We distribute the parentheses and apply the basics of plus and minus rules. That is, "- (- 3)" is same as "+ (3)". And "4" as per our Circle Equation can be re-written as a exponential form of "2^2"

$\mathbf{(x - 2)^2 + \big(y - (- 3) \big)^2 = 2^2}$

Compare this to our original standard form of Circle Equation. Here, the center points "a" and "b" are "2" and "- 3". The radius is on the right hand side, that is, "2".

$\boxed{\mathbf{\underline{\therefore \quad Center \: \: (a, \: b) = (2, \: - 3); \: Radius \: \: r = 2}}}$

Hope it helps.

5 0

4 years ago