The 1-1-2-2 Put Ratio Trade

Like all the front ratio type trades I have shared, this trade is a defined risk version of a very similar front ratio trade featuring naked short puts. My versions hedge the trade with long puts to limit the risk. However, in this trade, I will also discuss the unlimited risk version of the trade, the 1-1-2, because the additional risk isn’t that much from a practical standpoint.

I’m a big fan of front ratio type trades. I’ve written about my success with Broken Wing Butterflies and Broken Wing Put Condors. Another trade that fits in the group is the 1-1-2-2 Put Ratio. I don’t know of a named reference to a bird or insect for this trade, so I’m going with 1-1-2-2. Like all the front ratio type trades I have shared, this trade is a defined risk version of a very similar front ratio trade featuring naked short puts. My versions hedge the trade with long puts to limit the risk. However, in this trade, I will also discuss the unlimited risk version of the trade, the 1-1-2, because the additional risk isn’t that much from a practical standpoint.

I picked up the concept of this trade from one of my favorite traders, “Sweet Bobby” Gaines, who I have mentioned previously in at least one other page on this site. Bobby is a big proponent of the 1-1-2 trade, and has posted numerous videos on it on his YouTube channel, including his recent rising star appearance on Tasty Trade. But really, the trade is the next level of evolution moving from broken wing butterfly to broken wing condor to “one louder” as they say in the mythical group Spinal Tap.

What all these trades have in common is selling an out of the money debit put spread, and financing by selling further out of the money puts or wider credit put spreads. The combination delivers a net credit, but also sets up an interesting dynamic of extra rapid decay of the premium involved. The farther out puts or put spreads decay faster than the closer debit spread, and often lead to the debit spread having more value than the credit spread. These trades take in a credit to open, and often can take in a credit to close. At least that’s how I set them up and manage them.

All these trades are a variation of a front ratio spread, where more options are sold than bought with hedges added to define risk. I’ve also written about back ratio spreads where more options are bought than sold. Front ratios are designed for maximizing decay, while back ratios set up multiple long positions paid for by a costly short position.

The previously discussed broken wing condor could also be called a 1-1-1-1 trade. In that trade we buy a put spread and then sell another put spread further out for more money, collecting a net credit. Four different strikes, 1 contract each. So what is a 1-1-2-2?

1-1-2-2 Basic trade setup

The 1-1-2-2 takes this a step farther, because we use two credit spreads very far out of the money to pay for the debit spread. The 1-1 part is buying a put around 25 delta and selling a put around 20 delta. The 2-2 part is selling two puts at around 5 delta and buying two puts around 1 delta. The goal is for the 2-2 to sell for about twice what the 1-1 cost. I like to set these up with 45-55 days remaining to expiration, quite a bit longer than the other ratio trades I’ve discussed.

What is the advantage of this? Well, because each of the two short strikes are further out, we greatly improve the odds of being profitable, and increase the initial rate of decay of the total position. We end up with a big gap between the debit spread strikes and the two short put strikes. Lots of good things happen with this setup. The biggest upside is that there is no upside risk- if price goes up, the trade makes money. The downside of this trade is that it can consume a lot of capital and has significant tail risk, which we will get into before we are done. Let’s look at a typical example.

Pricing and Greeks for the 1-1-2-2 position
In this example, each of the two low delta puts collect about what the debit spread costs (~$10).

The first thing I want to point out in this example is that the 3100 short put is 900 points below the current price of $4000. For that strike to get in the money, it would take a 22.5% decline in the market in 55 days. That won’t happen very often. To be fair, this example uses values with VIX at 25, a historically higher than average value, but for the timeframe of 2020-2022, a fairly middle of the road level. The higher that implied volatility is, the farther away the short strikes can be and still collect meaningful premium.

The next thing to point out in the setup numbers is the Greeks. Delta is fairly flat at +3. For a credit trade, that isn’t much and means that the position can handle some movement in price. Theta is $69/day, and we collected $805. So, the position is expected to lose 1/12 of its value each day. But we have 55 days, so how does that work? Quite well, I’d say.

Finally, we can’t ignore the capital risk of $115,000. How can this be? If the price drops below $2500 at expiration, a 47.5% drop, the loss would be $115,000. While extremely unlikely (we didn’t lose that much in the Covid crash of 2020), it is possible in some disastrous scenarios. We’ll discuss this later as it impacts capital requirements and how one perceives risk. At the end of this post, I’ll explain how we can get into this trade for a fraction of this buying power.

Numbers are one thing. A picture or three might help make this all more clear.

overall profit profile chart
The dotted lines represent expected moves. This trade is profitable at expiration if the market doesn’t go down more than two expected moves.

This chart shows how changes in the underlying price will impact the profit and loss of the trade. We evaluate at four points in time. The green diamond shows our initial position at 55 DTE, underlying price is $4000, and the P/L is zero. The curvy lavender line shows how price would likely impact the position with 35 DTE. The green curve shows the likely profit at 14 DTE, and the sharp purple lines are the expiration values. We know exactly what expiration values will be at any price, but the curves are estimates based on likely impact to implied volatility as time passes and prices change.

I’ve put in dotted lines to show the expected move and multiple expected moves down. If you need a refresher, check my earlier post on expected moves. It is likely that price will end up inside of one expected move, the dotted lines on either side of the current price of $4000. There is approximately a 2% chance that price will move two expected moves to the second dotted line below the current price, which would still be max profit for this trade at expiration. And there is approximately a 0.3% chance of moving three expected moves to the far left dotted line. We can go further, but the odds keep dropping as we go to lower levels. However, as history has shown, moves down tend to have somewhat higher probability than theoretic probabilities once we get beyond two expected moves. The bottom long puts are a final defense to limit losses for going even more extreme in a rapid crash. The point is that this trade is very likely to end up profitable, but there is risk that an extremely big move down could lead to an extremely big loss. We’ll talk about ways to reduce exposure later.

Now that we’ve talked a bit about the very unlikely outcomes, let’s zoom in and discuss the most likely scenarios. Here’s the profit chart showing prices down to 25% below the current price with profit and loss zones highlighted.

This chart shows the profit and loss compared to most likely underlying price levels.

Zooming in allows us to see the profit levels in the timeframes referenced above. Notice that down moves initially can drive the position to a loss, but if the move doesn’t go below the two short puts at 3100, the position will be highly profitable at expiration. In fact, this trade does best in the very wide range of a price drop between 6 and 22 percent, bringing in up to $5000 additional credit.

If price goes up or drops less than 200 points, we can keep our initial premium at expiration. We may be able to collect more. The profit curve at 14 DTE is actually above the expiration profit if the price remains the same. How is this possible? Because the 1-1 debit put spread decays slower than the 2-2 credit spread, eventually the 1-1 part is worth more than the 2-2 part, even though the 2-2 part started out worth twice as much as the 1-1.

Let’s look at this another way. Prices don’t generally move immediately to a new level, but have probabilities of moves that get bigger over time. Again, going back to expected moves, let’s compare how we might expect price to move during the duration of the trade.

Price expected moves
This chart shows expected moves day by day from initiating the trade until expiration, and compares to the put strike prices.

In this chart I’ve shown several outcomes. The zero move is if price doesn’t change at all, a baseline. I’ve shown a +1% move which is in line with the positive drift of the market. There’s also a line for the positive expected move and the negative expected move, where price is likely to be within at any point in time. And finally I’ve shown a curve for a price move of two times the expected move down. Notice where the strikes are relative to the price curves are. The negative curves take time to get below the upper 1-1 put strikes, and never reach even the short put of the 2-2 credit spread.

Now let’s look at what happens to the value of our premium if price were to follow each of these curves. This is a view that you don’t see much because it is based on lots of assumptions for the pricing models. Since implied volatility is not predictable in the future, the chart makes assumptions for how price and time will most likely impact volatility and premium value.

option premium vs time
This chart shows how different underlying price trends would likely impact option premium over time.

Initially, this position collected $8.05 in premium, so we start with a negative or short value of -8.05. From there the price moves shown in the previous chart drive the premium up or down along with time decay. If price is flat or going up, premium decays and moves quickly toward zero premium. If the price goes down, the positive Delta pushes premium to more negative values. The price move of negative two expected moves really does a number on our premium initially, driving it down to below -30.

But, remember our profit chart at expiration? The flat and positive moves end up with a profit of our initial premium (all the puts have zero value at expiration, and the negative expected move and negative double expected move end up at maximum profit. Since our debit spread is 50 points wide, the negative moves would leave it fully in the money for a premium value of +50 points. And that’s in addition to the initial premium collected to open the trade. The challenge is that to get that max profit, we likely will have points in time where our position loses money.

The probability of getting to max profit is low because it would require a price drop between 6 and 22%. Based on our put strike Deltas we can estimate that we have about a 20% chance of that. Most of the other 80% is expiring with all strikes out of the money. So, it might be wise to zoom in and understand what happens with the vast majority of trades.

1-1-2-2 value vs. time chart
In most situations, the premium of the 1-1-2-2 front ration decays quickly, maxes out, and then levels off before losing value.

I used this chart as the featured image of this post because I thought it best illustrates how this trade plays out most of the time. If you remember when we discussed the Greeks, I pointed out that Theta is very high compared to the premium. From this chart we see that if price stays the same or is slightly up, premium will decay to zero by 35 DTE, or just 20 days into the trade. This is an example that Theta isn’t 100% accurate by itself as it looked like 12 days of Theta should move us to zero value. It could be that IV modeling is slightly off or the Theta was off, but still we have very rapid decay that I don’t think anyone can complain about.

Like all ratio style trades we have discussed, this trade has the possibility of switching from negative to positive premium. The difference with this trade is that it is actually quite likely, and as such we need to plan for it and manage our profit accordingly.

I’ve colored in the area under our three flat-to-positive curves with three zones each. There is a green zone where positive premium is growing, a yellow zone where premium is topping out, and a red zone where positive premium is being lost. Notice that the curve of the 1% up move and no price move are fairly close together, and that’s because the price movement is relatively close to the same compared to the other moves we are analyzing.

Let’s review how this happens. This trade essentially has two spreads, a slow decaying debit spread (1-1), and a fast decaying credit spread (2-2). The credit spread decays faster because it is farther out from the money, is much wider, and has twice the value to start with. All these factors help decay happen more quickly. As long as the price stays fairly stable, this relationship will hold. Theta will be the primary driver of the premium value, and the wide credit spread will get to be worth less than the narrow debit spread.

The most likely scenario is that we stay inside the expected move and travel somewhere close to the no price move or 1% up move. Let’s realize that the market doesn’t move in equal amounts every day like this chart, so think of it as a smoothed out version of what premium would do. In the real world, premium would bounce up and down with price. However, if our price is close to where we started with 20 days until expiration, we would expect that the premium switch to positive has about maxed out, and it is probably a good time to close out the trade. Hopefully,your trading platform has a analysis feature that lets you look at your position and see how profits are changing day by day to help determine when the position is as high as it can go.

Without a chart, another way to determine how close the trade is to switching direction is to watch the position Theta. At the beginning of this trade, Theta was 0.688, or $68.80 for the full contract per day. As the trade progresses, Theta will decrease and at some point when the premium goes positive, Theta will turn from positive to negative. As it gets close to zero, that is the peak premium value. I generally try to exit the trade a few days before Theta is projected to turn negative. A big up day for the market could quickly change my very positive premium to not as positive premium, so it isn’t a time to get greedy.

So that brings us to the curve for the positive expected move. This is the curve that assumes that the price follows the one standard deviation move up. The good news when this happens is that premium decays very quickly because Delta and Theta team up. The not so good news is because the price move gets so far away from the strikes, the total position won’t get to a very high positive value. This is because all the options will drop in value quickly, approaching zero, and the upper debit spread won’t have much value. A big move up means that the probability of any of the strikes going into the money will be very low, so there is very little premium. As a result, it is likely we won’t be able to get out for much positive premium if any at all, but we will be able to keep most, if not all the premium from the opening trade. This is the least stressful outcome of the trade. If the price moves up faster than the expected move, premium will likely drop to very close to zero and may not ever go positive. So, if price is up a lot and the trade can be closed for a credit, I take the money and run. I’m happy to have a quick, winning trade.

The risky outcomes

Looking at the position vs time value chart, there are two lines that represent what happens if price goes down. One is the move down one expected move and the other is down two expected moves. Interestingly, in this example, both end up at max profit by the end of the trade. So, it would appear that the trade can’t lose, which is far from true. Notice that these premium values may go very negative if prices drop quickly after opening the trade. This is because the narrow debit spread doesn’t pick up as much value from increasing delta as the wide credit spread does in a down move. We know that if price stays above our credit spread short strike at expiration, we will make money, but when price moves quickly down, it isn’t clear that price will level off.

So, as a trader, we are left with a choice when the market drops, We can take a loss and get out of the trade, or wait to see if the market quits dropping before it tests or violates the credit spread strikes. If we are a week or two into the trade, a decent down move will not make a huge impact, but initially the trade can take a big hit from a down move. The longer we are into the trade without a big down move in price, the less the risk is of a loss. On the flip side, a big move down opens the possibility of additional big down moves that can lead to a very big loss. We reviewed the odds earlier- about 4% of the time the trade will lose based on the far short puts having an initial Delta of 4. If this trade is done enough times, there will be some losses. Let’s look at some management actions that could be taken.

1. Set a stop based on premium price. In this example, we collected just over $8 premium to open the trade. So, we could set a stop to avoid losing twice ($16) or maybe even three times ($24) our initial premium. This would mean a stop loss if premium climbs to $24 or $32, given that $8 premium is our starting break-even point. This is the simplest risk mitigation strategy. Using this will lower the overall win rate as many negative scenarios would end up fine if not closed, but this management technique will prevent huge losses that might impact the account dramatically.

2. Close the trade if the underlying price goes below a trigger point. We know this trade has a lot of cushion. We can handle much more than one expected move and be profitable. But if the move is much more than expected, we have to consider that the move is very unusual and dangerous for us. Perhaps our point to get out is when the debit spread is in the money, or when we are half-way between the debit spread and credit spread. Or maybe it is the short strike of the credit spread that is the final trigger to get out. The further down we allow price to go down, the more we stand to lose. Pick the underlying price where it gets too uncomfortable and use that as the trigger point to get out of the trade.

3. Roll out in time if premium or price triggers are hit. If the position is rolled before the credit spread is in the money, it can be rolled out for a credit. This gives more time for the market to turn around. However, it gives more time for a losing trader to lose more, because we likely can’t roll down that far and still get a credit, and we will likely have to pay to roll the debit spread or narrow the distance between spreads, making the trade less attractive. If the price move continues down, there will be much less room to maneuver going forward.

4. Simply hold on and hope the probabilities play out. With 55 days in the trade, we just need to move down less that two expected moves by expiration. If the capital is available, and the conviction is there, holding can bring max profit with a big down move. Note that as time passes and the credit spread stays out of the money, the premium has to go away, so the value can evaporate very quickly with very high Theta as expiration approaches. This can be observed in the value vs time graph for the -2 EM curve. It can also result in max loss. As expiration approaches, the difference between max profit and max loss is just a few percentage points of price movement and max loss is much more than max profit.

In this example we can see that a move down of one expected move really doesn’t challenge our position, while two times the expected move is playing with fire. So, one approach might be to hold as long as the move stays within the expected move to the downside and switch to closing or rolling once the move exceeds that or some other multiple of expected moves. In any case, a trader has to know their risk tolerance and have a management plan for both winning and losing trades.

What about calls?

A logical question might be- if this works so great for puts, why not double up and do it for calls as well? Well, there’s one problem- skew. On indexes implied volatility is higher as strikes go to lower values and declines for higher strike prices. As a result, out of the money puts have higher implied volatility than out of the money calls. More importantly, far out of the money puts have higher implied volatility than puts closer to the money.

Look at our setup for this example. Implied volatility of the single long put is around 25, while the two short puts have implied volatility of 39. This helps two ways. The short puts have more of their premium tied to volatility, bumping up their price compared to the long put. Also, the higher implied volatility pushes the strike price further down to get a matching premium to the debit spread, making the trade a higher probability of success. We are selling more of the higher implied volatility and buying lower implied volatility, a key reason to use front ratio spreads.

A similar setup for a 1-1-2-2 call trade would reverse the dynamics. The long call closest to the money would have the highest implied volatility and the two short calls would have the lowest. To collect similar amounts to the put trade, the call strikes would be much closer between the debit spread and credit spread, and the difference in the deltas of the strikes would also be closer together, meaning a narrower window of max profit, and a higher probability of max loss. While still a trade with positive probability, it generally isn’t as attractive as the put side.

1-1-2 vs 1-1-2-2

I haven’t talked much about the two long puts bought at less than one Delta to open the trade. They are very unlikely to ever be in the money, and most traders would opt to close or adjust the trade well before they came into play. So, why have them? The simple answer is that they define or limit the risk of the trade, potentially reducing the capital required for the trade, and protecting from absolute disaster in the event of a market crash of over 37.5% in under 55 days. It could happen, like it did in February and March of 2020 during the Covid pandemic. We are giving up 20% of our premium to protect for a once or twice in a lifetime super crash.

So, what if we eliminate the long puts and do a naked 1-1-2 ratio spread? Is it different in outcome or probabilities? The answer is that it is very similar in most ways, and we will also see that a lot depends on the type of account you are trading in as to what choices there are. First, let’s start with the setup of the 1-1-2 trade.

The 1-1-2 setup is similar to the 1-1-2-2
The 1-1-2 trade has two naked puts sold short, but way out of the money.

While this table shows the risk as unlimited, it is actually $618,855, the value of two 3100 puts if SPX went to zero by expiration ($620,000) less the $1,145 collected to start the trade.

Some accounts and some brokers require all trades to be defined in their risk. For example, retirement accounts generally aren’t allowed to use option margin and so any naked put would have to be cash secured. For this trade, eliminating the two long puts would mean the max loss would go up to $618,855, assuming that SPX went to zero, while we are holding two short 3100 puts. SPX will only go to zero if we see modern society end, and in that case, we’ll probably have bigger problems than our option positions. But rules are rules, and so if you want to trade without the long puts in a retirement account, you would need $620,000 capital to make a likely $800-$1200 or less than 0.2% return in 55 days or less. We’ll discuss other alternatives after we review the details of the 1-1-2 trade.

The profit profile for 1-1-2 is similar to 1-1-2-2
The profit profile for the 1-1-2 is very similar to the 1-1-2-2 other than the virtually unlimited loss.

Remember that our starting underlying price is $4000 and the trade is profitable at expiration as long as price is above 3100. The chart above doesn’t show losses all the way down to zero price, but just imagine zero price and -$618,855. Our probability of profit is 96% if held to expiration based on the Delta of 4 for the naked puts.

value vs time for 1-1-2
Most scenarios show a profit with 1-1-2

Looking at 1-1-2 values over time at the same price moves that we looked at for the 1-1-2-2 trade, we can see that the premium changes are fairly similar. Staying within one expected move keeps the trade moving in the direction of decay.

zoom in on 1-1-2 value over time
Zooming in on most likely outcome’s value over time

If we zoom in on the likely outcome, we see that premium behaves very similarly to what we saw with the 1-1-2-2 trade setup. We just have more premium collected to start with, taking a bit longer to fully evaporate and have the premium turn to a credit for closing. The concept is the same.

Summarizing the differences between the 1-1-2-2 trade and 1-1-2 trade, the 1-1-2 trade collects about 20% more premium in exchange for more loss if the market drops more than 37.5% in the 55 days of the trade. How likely is it for the market to drop more than 37.5%? Is buying the long puts for protection worth it? That’s up to each trader to decide.

Buying power requirements

I usually don’t spend much time talking about buying power because most trades I do are defined risk credit trades where the amount collected is a significant portion of the capital at risk. This trade is not so much, whether defined risk (1-1-2-2) or a naked ratio spread (1-1-2). In non-margin accounts, we collect 0.7% or 0.2% respectively, which isn’t much.

Below is an analysis of different possible ways to trade. I looked at trading each of these strategies three different ways. First, I looked at a cash secured account, like a retirement account. Next, I looked at an account with margin for naked options. Finally, I looked at a much different approach, trading futures options with span margin. The margin and span margin amounts came from entering this trade into the tastyworks trading platform.

Buying power differences for Margin and Futures
Comparing buying power impact of different account types for the two strategies

I highlighted some key takeaway points. First, is how leveraged span margin with futures options can be for this trade. Our most capital efficient trade would be doing the 1-1-2-2 on futures span margin where we would collect 100 times the premium as a percentage of buying power (20%) than the non-margin account of the 1-1-2 trade (0.2%). Of course, with leverage comes much more risk. I chose to consider a loss of 10 times the initial credit as a practical worst-case scenario. The span margin would end up costing huge amounts more in a disaster and could potentially wipe out an account if the trade used a high percentage of the account’s capital.

A couple of weird margin anomalies to point out. In my margin account, the defined risk 1-1-2-2 trade required almost twice the buying power as the undefined 1-1-2, which is weird because clearly there is more risk in the naked 1-1-2. I think it may be that the calculation for defined risk is normally much less than undefined and the software may just assume that margin is not useful in defined risk. On the other hand, defining the risk on the futures version cut the buying power by 1/3. Different brokers may calculate their margin requirements differently, so don’t take this as universal truth. Similarly, remember that while defining risk usually increases the return on capital, it makes outsize losses more likely, especially when scaling up. Notice that the highly leveraged futures 1-1-2-2 would lose twice as much as a percentage of capital that the futures 1-1-2 setup in a 10x loss. I discussed this phenomenon in detail in my post on comparing risk.

Remember that margin and span margin change as the trade progresses depending on the market behavior. Span margin is subject to big swings when prices go against a position. A broker may force a position to close much earlier than a trader would want to get out due to expanding capital requirements. So, while initially the position is cheap to enter, a trader needs to limit each position to a fraction of the overall account size.

But the good side of this is that this trade can be entered for a very small cost. The trade is very high probability. We can also make more than the premium collected. I didn’t include it in the chart, but maximum profit for the most leveraged choice above would be $5,805 profit on $4,000 buying power, a return on capital of 145%. And there is over a 20% probability of that happening.

One final note on the buying power analysis table. To keep the quantities an apples-to-apples comparison, I used double the number of /ES futures options because futures options only control half as much value as SPX index options. So, technically, those futures options trades listed are 2-2-4-4 and 2-2-4 because they use twice the number of contracts to get the same notional exposure. I reviewed differences between index options and futures options in detail in my post about different ways to trade options on the S&P 500 index.

What about small accounts?

Readers looking at this may be thinking, “Gee, this is great for multi-millionaires, but what if the account is too small to consider any of these buying powers?” Great question- there are other alternatives. First off, a trader could use half the buying power listed by just trading options on one contract of the Mini S&P 500 futures (/ES). The 1-1-2-2 example would only take $2,000 buying power for $402 premium received. But, if that is still too much, we can make it a lot less.

Many traders are more familiar with options on the SPY exchange traded fund, which trades at approximately 1/10 the value of the S&P 500 index. For futures options, there is also options on the Micro S&P 500 futures contract (/MES), equal to 1/10 of the /ES contract size, or 1/20 of the size of an SPX option. By using SPY or /MES, we cut the size of the trade down by 1/10 compared to the above table. If the account is taxable, another choice would be the $XSP index, a 1/10 value index of the S&P 500 with favorable tax treatment, but lower liquidity. Again, all these alternative versions of S&P 500 options are discussed in my post on different S&P 500 choices.

So, for an account with futures trading capability, this trade could use /MES futures options and get into the 1-1-2-2 trade for just $200 buying power. An account with options margin could use SPY or $XSP and get into the 1-1-2 trade for $6,800 buying power. A trader doesn’t need a million dollar amount to trade this.

Concluding thoughts

I know a number of people who have traded versions of this trade during the bear market of 2022 without any issues. In fact, it could be argued that this trade, like most trades that collect credits from selling puts, works best if entering when the market is already down and implied volatility is high. Bad scenarios are already priced into option premium and there is a lot of cushion between strikes. This trade is most dangerous when volatility is low and prices are high- the probabilities are not as good, because a move of more than two times the expected move down is not nearly as far.

While not for everyone, the 1-1-2-2 and 1-1-2 trades provide a very high probability of success with a nice payout when used with leverage. The trade requires monitoring to maximize profit and to prevent catastrophic loss, so it really is not a set it and forget it trade. The key is to have a plan to manage the position if the market goes against the trade and stick to the plan.

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