2,410
(1,000)

## Driver: San Francisco

There are a maximum of 50 Driver: San Francisco achievements worth 2,410 (1,000)

32,776 tracked gamers have this game, 1,100 have completed it (3.36%)

# Now You See Me...40 (30)

### Complete Chapter 4

• Unlocked by 18,309 tracked gamers (56% - TA Ratio = 1.33) 32,784

## Achievement Guide for Now You See Me...

Solution
This is a pretty straightforward chapter with two main sections. Obviously, there are spoilers below.

The first section of the mission involves tailing a suspect, Krug. This is quite similar to chapter 2, where you tailed Leila Sharan, only this time you’re instructed to stay 40m behind the target to pick up his phone calls. In practice, you can be anywhere between 40m and 90m before the game complains that you are too close or too far behind the suspect. After a while, he’ll make a second phone call which initiates a chase where several cars will try to damage Krug. You’ll need to take them out by shifting into oncoming traffic and causing head on collisions, don’t bother trying to ram them from behind with Tanner’s car. Be very careful not to hit Krug or Tanner’s car in the process, it’s pretty easy to do in the confusion. Once the enemy cars are dealt with, Krug will speed off and you once again have to tail him like before. Be ready for this, as it’s easy to lose him at the beginning of this section. Eventually, he’ll pull into an alley and you’ll watch a cut scene signifying the end of this mission.

The second section will initially require you to chase Jericho, only you’ll find out soon enough that it isn’t him. Jericho now also has the ability to shift, and you’ll need to get to the safe zone before he destroys your car. When Jericho shifts into a vehicle, you’ll see a flash of lightning and the car will glow red. Fortunately, he’s fairly easy to avoid if you keep your speed up and follow the main freeway which heads towards the marker – more often than not, he’ll shift into vehicles that are too close and he’ll not be able to get them into your path in time.