All categories

3 years ago

PLEASE HELPP use the spinner to find the odds in favor of stopping on a multiple of 6

Mathematics

1 answer:

Alex777 [14]3 years ago

7 0

1 and 9 are the awnser

You might be interested in

Four times a certain number increased by 6 is equal to 94.

Nikolay [14]

4x+6=94 is the answer

6 0

3 years ago

Anna hiked 95⁄8 miles in 23⁄4 hours. How fast did she walk overall? A. 31⁄4 miles per hour B. 35⁄8 miles per hour C. 31⁄2 miles

Pani-rosa [81]

Answer:

C. 3 1/2 miles per hour

Step-by-step explanation:

I just converted the fractions to decimal form.

5/8 = 0.625 9 + 0.625 = 9.625

3/4 = 0.75 2 + 0.75 = 2.75

Now divide the 2 numbers:

9.625 / 2.75 = 3.5

Finally, convert the decimal back to a fraction:

3.5 = 3 1/2

Hope this helps!

6 0

3 years ago

Read 2 more answers

Hello <br><br><br><img src="https://tex.z-dn.net/?f=%20%5Cfrac%7B4%7D%7B5%7D%20%20%5Ctimes%20%20%5Cfrac%7B8%7D%7B9%7D%20%20%3D%2

Yuliya22 [10]

Step-by-step explanation:

= 4/5 × 8 /9

We will cross multiply

= 40 × 36 / 45

= 1440 / 45

= 32

6 0

3 years ago

Read 2 more answers

From 85 books to 150

Lostsunrise [7]

I'm not sure what the question is but I think your asking 150-85=65

8 0

4 years ago

Lim x-0 3x²/(1-cos5x)

mylen [45]

The limit is presented in the following undefined form:

$\displaystyle \lim_{x\to 0}\dfrac{3x^2}{1-\cos(5x)} \to \dfrac{3\cdot 0^2}{1-\cos(5\cdot 0)} = \dfrac{0}{0}$

In cases like this, we can use de l'Hospital rule, which states that this limit, if it exists, is the same as the limit of the derivatives of numerator and denominator.

So, we switch

$\dfrac{f(x)}{g(x)}\to\dfrac{f'(x)}{g'(x)}$

The derivative of the numerator is

$\dfrac{d}{dx} 3x^2 = 6x$

Whereas the derivative of the denominator is

$\dfrac{d}{dx} (1-\cos(5x)) = 5\sin(5x)$

So, the new limit is

$\displaystyle \lim_{x\to 0}\dfrac{6x}{5\sin(5x)} \to \dfrac{6\cdot 0}{5\cdot 0} = \dfrac{0}{0}$

So, it would seem that we didn't solve anything, but indeed we have! Recall the limit

$\displaystyle \lim_{x\to 0} \dfrac{ax}{\sin(bx)} = \dfrac{a}{b}$

to conclude that the limit converges to \dfrac{6}{25} [/tex]

4 0

4 years ago

Read 2 more answers