Let x= the length ofan object in meters and y= the length
of the same object in millimeters. Which
is a smaller number, x or y?

Answers

Answer 1

Answer:

Step-by-step explanation:

y is smaller because

1 millimeter = 0.001m

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What is 12 12/8 rounded to the nearest thousands

Answers

Answer:

13.5

you do that by dividing 12 and 8 to get 1.5, then add that extra 12

13.5
You divide 12/8 and then add 12

The number of light bulbs sold each day in two different hardware stores is represented in the box-and-whisker plots below. Which store's median number of light bulbs sold is greater?

A.

Store A

B.

Store B

C.

both the same

D.

cannot tell from given plots

Answers

Answer:

A. Store A

Step-by-step explanation:

The median is shown by the very middle line of the box. The middle-most line on the box of store A is greater than that of Store B

A chef uses 4.54
.
5
cups of tomatoes to make each batch of pasta sauce. If
t
represents the number of cups of sauce, which equation models this situation?

Answers

4.5(t)

..........(dots are to fill in the spots)

t=4.5s, where s is the number of batches

hope this helps :)

A kite has a string that is 300 ft long, The flying kite forms a 62°angle with ahorizontal line running parallel to the ground the bottom end of the string
is 6 ft off the ground. How high is the kite? Round your answer to the nearest
tenth

Answers

The height of the kite from the ground is 270 feet.

What are trigonometric identities?

There are three commonly used trigonometric identities.

Sin x = 1/ cosec x

Cos x = 1/ sec x

Tan x = 1/ cot x or sin x / cos x

Cot x = cos x / sin x

We have,

/ |

300 ft / |

/ |

A_62°___________|C

| 6 feet

E|________________D

Now,

Sin 62° = BC/AB

0.88 = BC/300

BC = 0.88 x 300

BC = 264 ft

Now,

The height of the kite from the ground.

= BC + CD

= 264 + 6

= 270 ft

Thus,

The height of the kite from the ground is 270 feet.

Learn more about trigonometricidentities here:

brainly.com/question/14746686

#SPJ5

Answer:

270.9 ft

Step-by-step explanation:

6 + 300sin(62)

= 270.8842779 ft

What would be 47/6 as a mixed number?

Answers

An easy trick I learned was, " How many times can 6 (the bottom number/denominator) go into 47 (the top number)?
6 times what id 47?
Nothing so we have to try again.
6 x 8= 48 too high
6 x 7= 42 good

Now 47 - 42 is 5.

So the answer is 7 5/6 because 6 can go into 47 7 times without going over.

Hope this helped!

Solve the problem. Type the number in the box that correctly completes the sentence.Nimrod wanted to build a tower three miles high. He wants to know how far would it be from the top of his tower to a point four miles away from the base of the tower. The distance would be Answer
miles.

Answers

Answer:

5 miles

Step-by-step explanation:

Think of this like a triangle. From the bottom of the tower, to the top of the tower, to the point 3 miles away, and back to the bottom of the tower.

So we already have 2 side lengths. The height of the tower, 3 miles, and the base, 4 miles. In order to find the 3rd length, the distance from the top of the tower to the point 4 miles away from the bottom, we need to apply the formula A squared + B squared = C squared.

We have A and B, (3 and 4) and we need C.

A squared (3 squared) is 9

B squared (4 squared) is 16

so 9 + 16 = C squared

9 + 16 = 25

C squared = 25

square root of 25 is 5

C = 5

The distance from the top of the tower to the point 4 miles away is 5.

Final answer:

By applying the Pythagorean theorem to the given problem, we find that the distance from the top of the tower to the point four miles away from the base of the tower is 5 miles.

Explanation:

Nimrod's problem is a classic application of the Pythagorean Theorem, which states that in a right-angled triangle, the square of the hypotenuse (the side opposite the right angle) is equal to the sum of the squares of the other two sides. In this case, the height of the tower is one side of the triangle (3 miles), and the distance from the base of the tower to the point Nimrod is interested in is the other side (4 miles). The distance from the top of the tower to that point is the hypotenuse.

Applying the Pythagorean theorem, we have: (Height of the tower)² + (Distance from the base to the point)² = (Distance from the top to the point)². So, this becomes: 3² + 4² = (Distance from the top to the point)². That simplifies into 9 + 16 = (Distance from the top to the point)², or 25 = (Distance from the top to the point)².

To find the actual distance (the length of the hypotenuse), we take the square root of 25, which is 5. Therefore, the distance from the top of the tower to the point four miles away from the base is 5 miles.

Using the Pythagorean theorem (a² + b² = c²), we can find the hypotenuse:

a² + b² = c²

3² + 4² = c²

9 + 16 = c²

25 = c²

c = √25

c = 5

So the distance from the top of the tower to the point four miles away from the base is 5 miles.