Long Strangle

B is correct. The long strangle is most appropriate for Marcus given his cost consciousness and expectation of significant volatility. While it requires a larger price move to profit than the straddle (breakeven points are farther from current price), it costs nearly half as much ($4.50 vs $8), limiting maximum loss. Since he expects significant volatility (which could easily move the stock beyond $95 or $105), the strangle offers an attractive risk/reward profile. Both his moderate aggressiveness and options experience support this strategy.

A is incorrect because while the straddle does profit from smaller moves, Marcus specifically mentioned being cost-conscious. The straddle costs 78% more ($8 vs $4.50), which conflicts with his stated preference. Given his expectation of significant volatility (not marginal moves), the extra cost may not be justified. C is highly inappropriate because selling a strangle has unlimited risk on the call side and substantial risk on the put side, making it unsuitable for a moderately aggressive investor. Selling naked options requires very high risk tolerance and significant capital. D is incorrect because options strategies can be suitable for moderately aggressive investors with proper experience and risk understanding, which Marcus has.

B is correct. The fundamental difference is that a long strangle buys out-of-the-money (OTM) options with different strike prices (higher strike call, lower strike put), while a long straddle buys at-the-money (ATM) options with the same strike price. This structural difference means strangles cost less (OTM options are cheaper than ATM options) but require larger price movements to be profitable.

A is backwards: it is the straddle that uses the same strike (both at current market price), while the strangle uses different strikes (one above and one below market). C is incorrect because both strategies involve only buying options (long positions). Neither involves selling options. If selling were involved, it would be a short strangle or short straddle. D is incorrect because both long strangles and long straddles have limited risk (maximum loss = total premiums paid for both options). The "long" in both names indicates buying, which always limits risk to the premium paid.

C is correct. Calculate both breakeven points using total premiums paid:

Upper breakeven (call side) = Call strike + Total premiums = $60 + ($2.50 + $2.00) = $60 + $4.50 = $64.50

Lower breakeven (put side) = Put strike - Total premiums = $50 - ($2.50 + $2.00) = $50 - $4.50 = $45.50

At $64.50, the call is worth $4.50 ($64.50 - $60), exactly offsetting the $4.50 total cost. At $45.50, the put is worth $4.50 ($50 - $45.50), also offsetting the $4.50 cost. Between these points, the investor loses money.

A incorrectly uses only the individual option premiums instead of total premiums (upper: $60 + $2.50 = $62.50, lower: $50 - $2.00 = $48.00). This is a common error but wrong because both premiums must be recovered. B uses just the strike prices with no premium adjustment, ignoring the cost entirely. D uses incorrect premium allocations and doesn't properly sum total cost.

C is correct (the EXCEPT answer). This statement is FALSE. A long strangle typically costs LESS than a long straddle, not more. The strangle uses out-of-the-money (OTM) strikes for both options, which are cheaper than the at-the-money (ATM) strikes used in a straddle. The cost savings is the primary advantage of the strangle, though it comes with the tradeoff of requiring a larger price movement to be profitable.

A is accurate: a long strangle does involve buying both a call and put on the same underlying security with the same expiration date. This creates a position that profits from movement in either direction. B is accurate: the maximum loss is limited to the total premiums paid ($call premium + $put premium). This occurs when the stock price at expiration is between the two strike prices, causing both options to expire worthless. D is accurate: the strangle is designed to profit from volatility. When the stock moves significantly beyond either breakeven point, one option gains value faster than the total cost, creating profit. The farther the move, the greater the profit.

D is correct. All four statements are accurate.

Statement 1 is TRUE: The call option has intrinsic value of $5. Calculate: Market price - Strike price = $95 - $90 = $5. Since the stock is trading above the call strike, the call is in-the-money and has intrinsic value.

Statement 2 is TRUE: The put option expires worthless. With the stock at $95 and the put strike at $70, there is no value in the right to sell at $70 when the market is $95. The put is out-of-the-money and has zero value.

Statement 3 is TRUE: The investor has a net profit of $2.50. Calculate: Call value - Total cost = $5 - ($1.50 + $1.00) = $5 - $2.50 = $2.50 profit. The $5 intrinsic value from the call exceeds the $2.50 total premium paid for both options.

Statement 4 is TRUE: If GHI had stayed at $80 (between the strikes), both options would have expired worthless (call OTM, put OTM), resulting in maximum loss equal to total premiums paid: $1.50 + $1.00 = $2.50. This represents the maximum possible loss for the strangle, regardless of where the stock ends up between the strikes.