Applecare+ by the numbers
So we’ve just bought a couple new iPhone 4S handsets and re-upped with AT&T for two years. We got a little bit of upsell pressure from the (otherwise pleasant and capable) AT&T salesperson to take out their phone insurance, but I demurred, thinking I’d opt for AppleCare+ since it now includes accidental damage protection. I’d read that there was some sort of December 15 deadline to buy Applecare+ over the phone, so I figured we’d just call and add it.
I was wrong; that December deadline was only for folks who’d bought their phones before the advent of the new service, which we hadn’t. Instead, we’d need to make a Genius Bar appointment and drive to the nearest apple Store (the Mall of Georgia) to have the phones inspected by a Genius if we want to purchase coverage.
So, the prospect of driving to the mall on the last weekend before Christmas gives me some pause. I also read this piece over at The Mac Observer, which is more to think about. The AT&T plan clearly makes no sense; although it covers theft, which Applecare doesn’t, it’s $7 a month, per handset, and replacements are $199.
Since “Smart Choices” is sitting on my desk (full disclosure: it’s 100% unread), and this is the sort of problem that could be approached with a structured decision, let’s give it a shot. We have a little data: I’ve had an iphone of some stripe for 4 years and have only had one headset replaced under warranty (which was arguably an indulgence from Apple for a wear item and not a true warranty claim). My wife’s had an iPhone for 2 years without a claim (there was that incident with a cat bowl, but I still have some silica gel left over from a successful home-remedy.) So, resisting the gambler’s fallacy, we can assume that the probability of getting through our 2-year contract without incident (since there’s a hardware warranty for 12 months, anyway) is fairly high.
Assumptions:
Applecare+ is $99, per phone, with $49 replacements for damaged handsets (up to two, per policy)
The AppleStore is an hour away, and it’s worth $30 per hour for me not to drive there.
Apple maintains their policy of offering $200 refurbs for damaged out-of-warranty phones.
If we break 4 handsets, the distribution will be 2, per policy
This gives us the following cost breakdown:
| Total Costs ($) | ||
| Replacements | AC+ | Risk It |
| 0 | 258 | 0 |
| 1 | 367 | 260 |
| 2 | 476 | 520 |
| 3 | 585 | 780 |
| 4 | 694 | 1040 |
| 5 | 954 | 1300 |
So, the optimal choice changes somewhere between one and two replacements? Not once we add what we know about our particular phone-replacement history. Ideally, I’d model the probability of breakage as some sort of Poisson process with a long tail, in which it would be possible, though unlikely, for us to break a dozen phones or more. For simplicity, though, let’s just say there’s a 2 in 3 chance we don’t break a phone, and there’s an evenly-decaying probability of 1-5 mishaps. If we multiply these odds into the cost estimates, above, we get:
| Adjusted Costs ($) | |||
| Replacements | Probability | AC+ | Risk It |
| 0 | 0.666 | 171.83 | 0 |
| 1 | 0.17 | 62.39 | 44.20 |
| 2 | 0.085 | 40.46 | 44.20 |
| 3 | 0.0425 | 24.86 | 33.15 |
| 4 | 0.02125 | 14.74 | 22.10 |
| 5 | 0.010625 | 10.14 | 13.81 |
| Total | 0.995375 | $ 324.42 | $ 157.46 |
So, given this estimated risk profile, winging it without insurance is the better plan (by a factor of two). How sensitive is the model to our assumptions about risk? What if we impose at least one broken phone on the risk profile?
| Adjusted Costs ($) | |||
| Replacements | Probability | AC+ | Risk It |
| 0 | 0 | 0.00 | 0.00 |
| 1 | 0.515 | 189.01 | 133.90 |
| 2 | 0.2575 | 122.57 | 133.90 |
| 3 | 0.12875 | 75.32 | 100.43 |
| 4 | 0.064375 | 44.68 | 66.95 |
| 5 | 0.032188 | 30.71 | 41.84 |
| Total | 0.997813 | $ 462.28 | $ 477.02 |
Even if we assume at least one mishap, the choice between the plans is essentially a wash and I have my Saturday free.
Is there a better way to do this analysis? Please let me know what you think in the comments.