Not for the faint hearted…

Have just been listening to several Ray Kurzweil TED talks about the pace of technology.

Apart from the speed, one of the most interesting & surprising things is how well technology progress measures, of all kinds, over the last few decades, fit an exponential curve. It got me thinking more about those curves in our own lives:

Since exponential curve behaviour is transforming our lives, understanding the properties of those curves is arguably the most important maths we all need to master.

Perhaps our biggest blind spot is not seeing when we’re on the ‘flat plains’ of a curve. One with the ever-steeper ‘mountain face’ of the curve ahead, still cloaked in mist. And like mountaineers approaching a steep mountain face to climb, our options are greatest before the ascent.

The least blurry view of the curve is early on, before the meteoric rise kicks in and things change at the fastest rate.

Some technology exponential curves must surely accelerate others. Probably less a case of ‘the more things change, the more they stay the same’ and more a case of ‘hold tight with both hands, for the ride of a lifetime!’

The more exponential curves swerve and jolt our lives, the more flexibility in the driving seat we require. And the bigger the flexibility toolset we’ll need for the ride. Note to self: spend more time thinking about the relationship between flexibility and exponential curve behaviour.

What do you think?

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Simon