Answer:
She either trained recently in an area with a high elevation, participated in blood doping, or has polycythemia vera.
Step-by-step explanation:
Michaela has a hematocrit value of 59%, which is well above the normal range, according to research that has found that athletes reduce hematocrit levels in the form of sports anemia.
This sports anemia is caused by increasing plasma volume into RBCs and increasing the total mass of hemoglobin.
But Michella has a significant increase in hematocrit rather than the normal range.
so hematocrit value suggest blood dopping which has resultted into increased hematocrit level
4ab8c
4(8)(4)(8(12)
(32)(38)(12)
(1216)(12)
14592
Answer: no solution
explanation:
first, use distributive property so 3(n+4)=1/2(6n+4) becomes 3n+12=3n+4
secondly, subtract 12 on both sides to get 3n=3n-8
then, subtract 3n on both sides to get 0= -8
this is false because 0 does NOT equal -8. therefore, the answer is no solution
Answer:
$3
Step-by-step explanation:
Given that:
p = 8 - ln(x) when 5 < x < 500
where;
x = The total number of dogs sold
Then;
The total revenue = x * p
R = x(8 - ln(x))
R = 8x - xln(x)
The Company thus pays 1 dollar per dog
i.e.
The total cost C = 1 * x = x
Then: Profit = R - C
P = 8x - xln(x) - x
P = 7x - xln(x)
Differentiating P in respect to x
dP/dx = 7 - d/dx(xln(x))
dP/dx = 7 - x*d/dx(ln(x)) - ln(x)*d/dx(x)
dP/dx = 7 - x(1/x) - ln(x)
dP/dx = 6 - ln(x)
Since this must be maximized, dP/dx is set to be equal to 0
6 - ln(x) = 0
ln(x) = 6
x = e^6
Now, p = 8 - ln(x)
Plug in the value of x :
p = 8 - ln(e^5)
p = 8 - 5
p = 3
Therefore, each dog must be priced at $3 to maximize the profit.
<em>SYMPTOMS:</em>
<em>- Cough
</em>
<em>- Shortness of breath or difficulty breathing
</em>
<em>- Fever
</em>
<em>- Chills
</em>
<em>- Muscle pain
</em>
<em>- Sore throat
</em>
<em>- New loss of taste or smell</em>
<em>- Trouble breathing
</em>
<em>- Persistent pain or pressure in the chest
</em>
<em>- New confusion
</em>
<em>- Inability to wake or stay awake
</em>
<em>- Bluish lips or face</em>
<em>~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~</em>
<em>Hope I seriously helped!!! :)</em>
<em>Stay safe deary... <3</em>