What's the difference between 8 848 and 10 911 meters

Answers

Answer 1

Answer: s what you do is 10,911-8,848=2063 so 2063 is the difference. the reason i subtracted is because difference also means subtract

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Subtract. Write your answer in simplest form. 4 5/8 - 1 1/8=____
(3xa+6):3+18=50 multumesc frumos
Which equation has exactly one solution?A. 4 - 12x - 9 = 0 B. 4 + 12x + 9 = 0 C. 4 - 6x - 9 = 0 C. 4 + 6x + 9 = 0 (Please show how you get the answer)
What are two other words used for hypotenuse

Can someone help me pls

Answers

Answer:

432 ft^2

Step-by-step explanation:

Answer:

432

Step-by-step explanation:

Lets plug it into the formula

b1 should be the horizontal line on the bottom horizontal line and b2 should be the top horizontal line

so we get b1 = 28 and b2 = 20

according to the formula we should add b1 and b2, getting us 48.

divide 48 by 2: we get 24

24 times h, or the hieght, or 18 is 432

so the answer is 432

could you pls give me brainliest? I only need 1 more brainliest to rank up ;-;

Please HELP me solve: the museum's show for July features 30 oil paintings by different artists. All artists show the same number of paintings and each artist shows more than 1 painting. How many artists could be featured in the show

Answers

if each artist shows more than 1 painting.so minimum number of painting per artist is 2.
so if every artist show same number of painting so maximum number of artists is 30/2 = 15

How do I differentiate (200000ln(t-0.1))/(39.95t^2)

Answers

$f(x)=(200000\ln(t-0.1))/(39.95t^2)=(4000000)/(799)\cdot(\ln(t-0.1))/(t^2)\nf'(x)=(4000000)/(799)\cdot((1)/(t-0.1)\cdot t^2-\ln(t-0.1)\cdot2t)/(t^4)\nf'(x)=(4000000)/(799)\cdot((t)/(t-0.1)-2\ln(t-0.1))/(t^3)\nf'(x)=(4000000\left((t)/(t-0.1)-2\ln(t-0.1)\right))/(799t^3)$

Answer:

$\frac { dy }{ dt } =\frac { 8\cdot { 10 }^( 6 ) }{ 799{ t }^( 2 ) } \left\{ \frac { 5 }{ 10t-1 } -\frac { \ln { \left( t-\frac { 1 }{ 10 } \right) } }{ t } \right\}$

Workings below. Don't know if it could've have been simplified further.

I've made a "smooth criminal" version, just in case you like things compressed.

$\frac { dy }{ dt } =\frac { n }{ { t }^( 2 ) } \left\{ \frac { 1 }{ t-k } -\frac { \ln { \left( { \left( t-k \right) }^( 2 ) \right) } }{ t } \right\} \n \n n=\frac { 4\cdot { 10 }^( 6 ) }{ 799 } ,\quad k=\frac { 1 }{ 10 }$

What are the dimensions of the matrix?[9 -4 19 41 0]
[11 6 -2 25 13]
1.) 1x10
2.) 2x5
3.) 10x1
4.) 5x2

Answers

the dimension of a matrix is the no of rows by the no of columns.

Here there are two rows and five column. So the dimensions of the matrix is 2 x 5

Doors for the small cabinets or 19.5 inches long. Doors for the large cabinets are 3.9 times as long as the doors for the small candidates. How many large doors can be cut from a board that is 11 feet long.

Answers

Answer: 1 large door.

Step-by-step explanation:

You know that the lenght of each door for the small cabinets is:

$lenght_((small))=19.5\ in$

Since the lenght of the doors for the large cabinets are 3.9 times as long as the doors for the small candidates, the lenght of any of these doors is:

$lenght_((large))=3.9(19.5\ in)=76.05\ in$

The lenght of the board is 11 feet, so you need to convert it to inches:

$(11\ ft)((12\ in)/(1\ ft))=132\ in$

Then, the number of large doors that can be cut from that board is:

$(132\ in)/(76.05\ in)=1.73$

So, 1 large door can be cut from that board.

Write an equation of a line in slope-intercept form if the slope is ½ and the y-intercept is -2.(A) y = (½)x + 2
(B) x - 2y = -4
(C) y = (½)x - 2
(D) 2y = x + 4

Answers

I was just learning about this. Okay,
First we need to plug in the values of the slope intercept form y = mx + b. b is the y-intercept so it is -2.

y = mx + -2.

Now lets find the rate of change or mx. the slope is 1/2 so the rate of change is 1/2. Lets plug in the value.

y = 1/2x + -2

The answer is A. Hope this helped!!

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