Three consecutive terms in an arithmetic sequence are $3e^{p}$, $5$, $3e^{r}$ - AQA - A-Level Maths Pure - Question 9 - 2017 - Paper 2

To find the possible values of $p$, we first recognize that the three terms are in arithmetic progression.

1. Setting Up the Equation: Since the terms are in an arithmetic sequence, the difference between the first and second term should equal the difference between the second and third term.

   Thus, we can set up the equation:

   $3e^{p} - 5 = 3e^{r} - 5$

   Simplifying this gives:

   $3e^{p} = 3e^{r} + 5 - 5$

2. Removing Constants: Next, we simplify the equation:

   $3e^{p} - 3e^{r} = 0$

   From this, we can express it as:

   $3e^{p} = 3e^{r}$

   Dividing both sides by 3 yields:

   $e^{p} = e^{r}$

3. Logarithmic Form: Applying the natural logarithm to both sides, we find:

   $p = r$

4. Finding r: Now we also need to find another equation using another difference:

   From $5 - 3e^{p} = 3e^{r} - 5$, we get:

   $5 - 3e^{p} = 3e^{r} - 5$

   Rearranging, leads to:

   $10 = 3e^{p} + 3e^{r}$\n

5. Final Solutions: Substituting $p = r$ gives:

   = 6e^{p}$$ Therefore: $$e^{p} = rac{10}{6} = rac{5}{3}$$ Taking the natural logarithm results in: $$p = ext{ln}rac{5}{3}$$

Thus, the possible value of $p$ is p = ext{ln}rac{5}{3}.