Answer:
Step-by-step explanation:
The third side is thus, less than 14 + 11 = 25 cm. The side cannot be less than the difference of the two sides. Thus, the third side has to be more than 14 - 11 = 3 cm. So, the length of the third side could be any length greater than 3 cm and less than 25 cm.
3 x 3000 = 9000 x blank x 1000 = blank x 1000 = blank000
im not too sure if there is anything specific you are supposed to fill in the other blanks with but from what you have provided i do believe you could use any number in the space of the first blank to fill out the rest of the equation. for example i you put 3 in the first blank space then the equation would write 3 x 3000 = 9000 x 3 x 1000 = 27000000 x 1000 = 27,000,000,000 but then this wouldnt work if on the question it says on the end thousand in writing. im sorry if this has not helped. if it does say thousand on the end comment below and i will reattempt this equation
Answer:
b = 8
Step-by-step explanation:
Using Pythagorean Theorem, a, we just plug in what we know.
We know that the hypotenuse, c, is 10 km. We also know that one of the other side lengths is 6 km, we can plug that into either a or b.
Now, our equation will be: .
You could also use the equation: .
Next, we'll just solve the equation.
,
b = 8
Good luck :D
Answer:
And we can use the z score formula given by:
And if we find the z scores for the limits of the interval we got:
And we want to find this probability:
And we can use the foolowing excel command and we got:
=NORM.DIST(0.878;0;1;TRUE)-NORM.DIST(-0.4;0;1;TRUE)
And we got:
Step-by-step explanation:
For this case we know the following parameters:
We select a sample size of n =59. So then the sample size is large enough to use the central limit theorem and the distribution for the sample mean is given by:
We want to find the following probability:
And we can use the z score formula given by:
And if we find the z scores for the limits of the interval we got:
And we want to find this probability:
And we can use the foolowing excel command and we got:
=NORM.DIST(0.878;0;1;TRUE)-NORM.DIST(-0.4;0;1;TRUE)
And we got:
You just round the numbers