Answer:
51 milligrams
Step-by-step explanation:
Exponential growth or decay can be modeled by the equation ...
y = a·b^(x/c)
where 'a' is the initial value, 'b' is the "growth factor", and 'c' is the time period over which that growth factor applies. The time period units for 'c' and x need to be the same.
In this problem, we're told the initial value is a = 190 mg, and the value decays to 95 mg in 19 hours. This tells us the "growth factor" is ...
b = 95/190 = 1/2
c = 19 hours
Then, for x in hours the remaining amount can be modeled by ...
y = 190·(1/2)^(x/19)
__
After 36 hours, we have x=36, so the remaining amount is ...
y = 190·(1/2)^(36/19) ≈ 51.095 . . . . milligrams
About 51 mg will remain after 36 hours.
Answer:
6 × 15 equals 90, and the sine of 90° = 1. That gives us 1 + 3. The answer then is 4.
Answer:
The answer is false
Step-by-step explanation:
" An event is certain if its probability is 100% "
Statistics is about probability of occuring of an event; you cannot buy 100% certainty. Statistics is about managing risk.
Hence the following given statement is not correct that: In statistics, results are always reported with 100% certainty.
Hence the statement is FALSE.
24.69 x 12 = 296.28
296.28 x 1.06 = 314.06
With tax and everything, the total bill rounds up to $314.06. Hope this helped!
First thing is that you need to find the diagonal of the rectangle
but remember is it a horizontal rectangle.
So let's start it :)
d= √6²+3²
d= √36+9
d= √54
d= 6.7082
But wait.. we are not done yet
We need to solve KT
we have 6.7082 which is the base and we have SL=4 which is the height
so with this 2 information we can find KT
KT is the hypotenuse because when you draw the line from K to T you'll see that it is the longest line.
Use the hypotenuse formula which is
C = √a²+b²
Now replace C by KT since we are solving for KT instead of C. Got it ?:)
KT= √6.7080²+4²
KT= 7.81
I do it with decimals so it might be little bit confusing to you but I think you can solve that different ways :)
Well I hope that's help and if not I am so sorry.
