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4 years ago

Help????????? Surface area

Mathematics

1 answer:

Dominik [7]4 years ago

3 0

Answer:

The surface area = 795.45 in.² to the nearest hundredth answer (C)

Step-by-step explanation:

∵ The surface area of the cylinder = 2πrh + 2πr²

∵ r = 6 in. and h = 15.1 in.

∴ S.A = 2π (6) (15.1) + 2π (6)²

= 795.4512 ≅ 795.45 in.² to the nearest hundredth

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22 pts for this question plz help

victus00 [196]

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3 years ago

On a straight road, Luis is 10 km south of a water tower and Don is 15 km north of the same water tower. Relative to the water t

Svet_ta [14]

Answer:

The midpoint of the positions of Luis and Don would be 5 km North of the water tower.

Step-by-step explanation:

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4 years ago

Please answer correctly ASAP !!!!!! Will mark brainliest !!!!!!!!!

BigorU [14]

Answer:

X=3/2 and 2/3

Step-by-step explanation:

6x^2 - 13^x + 6= 0

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3 years ago

What is<br> 3a+6b= 4 for b<br> Really need help

saw5 [17]

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3 years ago

A contractor is building a new subdivision on the outside of a city. He has started work on the first street and is planning for

ruslelena [56]

You can use those two given points of street 1 to form its equation, then can use the fact that parallel lines have same slope to find the equation of second street with the help of the point (1,5) which lies in second street.

The equation of the location of the second street in standard form is given as $2y = x + 9$

<h3>What is the equation of a straight line passing through two given points?</h3>

Let the two given points be (a,b) and (c,d). Then the equation of straight line passing through these two points is given by:

$y - b = \dfrac{(d-b)}{(c-a)}(x-a)$

<h3>What is slope intercept form of equation of straight line?</h3>

y = mx + c is the slope intercept form of straight line where m is the slope and c is the y-intercept (where the straight line cut on y = c at y axis) of the given line.

<h3>How to find equation of second street's location in terms of equation of straight line?</h3>

Firstly we will find the equation of straight line which represents street 1.

Since street 1 goes from point (-5,-6) and (3,-2), thus, its equation would be:

$y - (-6) = \dfrac{-2- (-6)}{3-(-5)} (x -(-5))\\
\\
y + 6 = \dfrac{1}{2}(x+5)\\
\\
y + 6 = \dfrac{x}{2} + \dfrac{5}{2}\\\\
y = \dfrac{x}{2} -\dfrac{7}{2}$

Thus, this above equation represents equation of location of street 1. The slope is 1/2 and y-intercept is -7/2.

Since the street 2 is parallel to street 1, thus we have its slope same as that of street 1. Writing the equation in slope intercept form we get:

$y = \dfrac{1}{2}x + c$

Since street 2 passes through (1,5)( x= 1, y = 5), thus, this point must satisfy above equation which represents all points lying on street 2.

Thus,

$5 = \dfrac{1}{2} \times 1 + c\\\\
c = 5 - \dfrac{1}{2} = \dfrac{9}{2}$

Thus, the equation representing points on street 2 is given by:

$y = \dfrac{x}{2} + \dfrac{9}{2}\\
\\
2y = x + 9$

Learn more about equation of straight line here:

brainly.com/question/19380936

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