MATHEMATICS HIGH SCHOOL

A can of soup is in the shape of a cylinder. The diameter of the can is 8 centimeters, and the height is 10 centimeters. What is the surface area of the can, rounded to the nearest hundredth square centimeter? (Use 3.14 for π.) 351.68 cm 2 251.2 cm 2 502.4 cm 2 100.48 cm 2

Answers

Answer 1

Answer:

Answer:

The surface area of the can is $351.68\ cm^(2)$

Step-by-step explanation:

we know that

The surface area of a cylinder (can of soup) is equal to

$SA=2\pi r^(2)+\pi Dh$

we have

$r=8/2=4\ cm$ ----> the radius is half the diameter

$D=8\ cm$

$h=10\ cm$

substitute the values

$SA=2(3.14)(4^(2))+(3.14)(8)(10)$

$SA=100.48+251.2=351.68\ cm^(2)$

Answer 2

Answer:

Answer:

351.68 is ur answer

Step-by-step explanation:

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Answers

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Answers

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A straight line is a line passing through the x-y plane that has equal intercepts with respect to the x axis and the y-axis. The slope of a straight line is always equal. The straight line is also satisfied by the coordinates points in the x and y axis respectively.

How to identify the points on the given line y = 2x ?

To identify the points satisfied by any given equation, we have to replace the points given in the following equation.

Taking first point in option (A) , (16,8) , we have y = 8 and x = 16 which does not satisfy the equation y = 2x .

Taking second point in option (B) , (1,3) , we have y = 3 and x = 1 which does not satisfy the equation y = 2x .

Now from the following options, checking points in Option (D) where x = 3 and y = 6 which satisfies the equation y = 2x .

Also checking the points in Option (F) where x = 5 and y = 10 which satisfies the equation y = 2x .

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To learn more about points in a straight line, refer -

brainly.com/question/2555347

#SPJ2

Answer: it’s (5,10) and (3,6)

An infinite geometric series has 1 and 1/5 as its frist two terms:1, 1/5' 1/25' 1/125' what is the sum,s,of the infinite series?A 1/4
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Answers

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for geometric series, the sum is always
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and multiply each term by r
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Answers

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Answers

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Answer:

What he said below was that it was your second choice

(hope this helps or at least thats what i got from it)

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Answers

Answer:

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Step-by-step explanation:

El método de reducción también llamado Suma y Resta, consiste en multiplicar una o ambas ecuaciones de tal manera que los coeficientes de una de las incógnitas sean iguales y de signo contrario, de tal forma que se eliminen al sumar las ecuaciones.

Nuestras ecuaciones son:

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Por lo tanto, x = 0 y y = 2

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