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3 years ago

How to write 41.344 in word form

Mathematics

2 answers:

lesya692 [45]3 years ago

8 0

Forty one AND three hundred forty four thousandths

Bogdan [553]3 years ago

6 0

41.344 in Word form is forty-one and three hundred forty-four thousandths (hope this helps:)

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Terrell is moving boxes in a freight elevator. Each box weighs about 25 pounds. For safety reasons, a maximum of 600 pounds can

k0ka [10]

Answer:

x ≤ 15

Step-by-step explanation:

25x + 225 ≤ 600

Subtract 225 from both sides and get

25x ≤ 375

Divide 25 from both sides and you´ll get

x ≤ 15

3 0

3 years ago

Pls help me I don’t understand this

I am Lyosha [343]

You didn’t put a question

3 0

3 years ago

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Can you simpilfy the expression of: 6x-8y-5x+3y<br><br>Answer in comments

Romashka-Z-Leto [24]

Answer:

Hey there. Ur answer is x-5y

Step-by-step explanation:

5 0

2 years ago

Read 2 more answers

A strobe light is located at the center of a square dance room. the rotating light is 40 feet from each of the square walls and

Effectus [21]

The equation of the rotating light is an illustration of a secant function

The equation that represents the distance between the center of the circle and the light source is $d(t) = 40\sec(\frac{\pi}{3}t)$

<h3>How to determine the equation</h3>

The equation is a secant function represented by

$y =A\sec(Bt)$

Where:

A represents the amplitude

So, we have:

$A = 40$ --- the distance of the light from each square wall

B represents the period, and it is calculated as:

$B = \frac{2\pi}{T}$

The light completes its full rotation every 6 seconds.

This means that,

T = 6

So, we have:

$B = \frac{2\pi}{6}$

Simplify

$B = \frac{\pi}{3}$

Substitute values for A and B in $y =A\sec(Bt)$

$y = 40\sec(\frac{\pi}{3}t)$

Rewrite as a function

$d(t) = 40\sec(\frac{\pi}{3}t)$

Hence, the equation that represents the distance between the center of the circle and the light source is $d(t) = 40\sec(\frac{\pi}{3}t)$

Read more about trigonometry functions at:

brainly.com/question/1143565

5 0

2 years ago

Explain how the Quotient of Powers was used to simplify this expression. = 22 By finding the quotient of the bases to be , and c

9966 [12]

the correct question in the attached figure

(2^5)/8=2^2

we have

8----------- >2^3

(2^5)/8----------- > (2^5)/(2^3)=2^(5-3)=2^2

therefore

2^2=2^2-- ------> is ok

the answer is by simplifying 8 to 2^3 to make both powers base two and subtracting the exponents

5 0

3 years ago