Answer:
a. 3.00 must be in mol/L and 2.00 in 1/min.
b. Using lineal equation:
t = 0.6 min then C = 1.45 mol/L
C = 0.10 mol/L then t = 1.12 min
Using exponential equation:
t = 0.6 min then C = 0.90 mol/L
C = 0.10 mol/L then t = 1.70 min
Explanation:
a) C is in mol/L so, as we know that the exponential does not have units, 3.00 must be in mol/L and 2.00 in 1/min.
b) If we want to make a line between 0 an 1 we need to find the linear equation for this.
We can use the slope intercept-equation:
y = ax + b (1)
Let's find a and b.
a is the slope of here, so we can use the next equation to find it:
[tex]a=\frac{y_{2}-y_{1}}{x_{2}-x_{1}}[/tex]
We have two points, (0,C₁) and (1,C₂)
[tex]C_{1}(0)=3.00e^{-2.00*(0)}=3.00 mol/L[/tex]
[tex]C_{2}(1)=3.00e^{-2.00*(1)}=0.41 mol/L[/tex]
So a will be:
[tex]a=\frac{0.41-3.00}{1-0}=-2.59[/tex]
We can use the equation (1) to find b, for instance, let's choose: [tex]y_{1}=ax_{1}+b[/tex]
[tex]b=y_{1}-ax_{1}=C_{1}-(2.59*0)=3.00[/tex]
Finally, our linear equation will be: [tex]y=-2.59x+3.00[/tex] or [tex]C=-2.59t+3.00[/tex]
Using lineal equation:
t = 0.6 min then C = 1.45 mol/L
C = 0.10 mol/L then t = 1.12 min
Using exponential equation:
t = 0.6 min then C = 0.90 mol/L
C = 0.10 mol/L then t = 1.70 min
I hope it helps you!
