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

Answer:

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.

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A sector of a circle is shown. Find its area, rounded to the nearest tenth. A)
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B)
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*I would like to know how you did it too*

Answers

The area of the sector of the circle, to the nearest tenth is: B. 10.5 cm²

What is the Area of the Sector of a Circle?

Area of the sector of a circle = ∅/360 × πr².

r = radius.

Given:

∅ = 68°

Radius (r) = 4.2 cm

Substitute

Area of the sector = 68/360 × π × 4.2²

Area of the sector = 10.5 cm²

Learn more about area of sector on:

brainly.com/question/22972014

Area of a circle = pi * radius^2
But we're not talking about a whole circle, but a portion of the circle.
The proportion of the area of the whole circle occupied by this sector is equal to the ratio of the created angle to the angle of a whole circle;
that may seem a bit confusing but basically:
Area of the sector = pi * radius^2 * 68/360
so...
Area = pi * (4.2)^2 * 68/360
= 10.467...
= 10.5 cm^2

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Answers

A counterexample is a statement that simply disproves another statement.

You could disprove "when it rains, it pours" by saying "sometimes when it rains, the rain is light."

A statement that disaproves another statement

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Answers

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1) In 2001, there were about 62.5 thousand golden retrievers registered in the United States. In 2002, the number was 56.1 thousand. Which linear equation best represents this information?(A) y = 6.4x + 2001
(B) y = -6.4x + 12868.9
(C) y = 6.4x - 12743.9
(D) y = -6.4x + 2002

Answers

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The linear-quadratic system has
(select)
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