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All pipes carrying fluids experience losses
of pressure caused by friction and turbulence
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of the flow. It affects seemingly simple
things like the plumbing in your house
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all the way up to the design of massive, way
more complex, long-distance pipelines. I’ve
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talked about many of the challenges engineers
face in designing piped systems, including
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water hammer, air entrainment, and thrust forces.
But, I’ve never talked about the factors affecting
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how much fluid actually flows through a pipe
and the pressures at which that occurs. So,
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today we’re going to have a little fun, test
out some different configurations of piping,
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and see how well the engineering equations
can predict the pressure and flow.
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Even if you’re not going to use the equations,
hopefully, you’ll gain some intuition from seeing
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how they work in a real situation. I’m Grady and
this is Practical Engineering. In today’s episode,
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we’re talking about closed conduit
hydraulics and pressure drop in pipes.
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This video is sponsored by HelloFresh,
America’s number 1 meal kit. More on that later.
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I love engineering analogies, and in this case,
there are a lot of similarities between electrical
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circuits and fluids in pipes. Just like all
conventional conductors have some resistance
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to the flow of current, all pipes impart some
resistance to the flow of the fluid inside,
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usually in the form of friction and turbulence.
In fact, this is a lovely analogy because
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the resistance of a conductor is both a function
of the cross-sectional area and length of the
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conductor—the bigger and shorter the wire, the
lower the resistance. The same is true for pipes,
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but the reasons are a little different. The fluid
velocity in a pipe is a function of the flow rate
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and the pipe’s area. Given a flowrate, a
larger pipe will have a lower velocity,
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and a small pipe will have a higher velocity.
This concept is critical to understanding the
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hydraulics of pipeline design because friction and
turbulence are mostly a result of flow velocity.
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I built this demonstration that should help
us see this in practice. This is a manifold
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to test out different configurations of pipes and
see their effect on the flow and pressure of the
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fluid inside. It’s connected to my regular
tap on the left. The water passes through
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a flow meter and valve, past some pressure
gauges, through the sample pipe in question,
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and finally through a showerhead. I
picked a showerhead since, for many of us,
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it’s the most tangible and immediate connection
we have to pressure problems in plumbing. It’s
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probably one of the most important factors in the
difference between a good shower, and a bad one.
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Don’t worry, all this water will be given
to my plants which need it right now anyway.
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I used these clear pipes because they
look cool, but there won’t be much to see
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inside. All the information we need will show
up on the gauges (as long as I bleed all the
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air from the lines each time). The first one
measures the flow rate in gallons per minute,
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the second one measures the pressure
in the pipe in pounds per square inch,
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and the third gauge measures the difference
in pressure before and after the sample
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(also called the head loss) in inches of water. In
other words, this gauge measures how much pressure
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is lost through friction and turbulence in the
sample - this is the one to keep your eye on. In
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simple terms, it’s saying how far do you have to
open the valve to achieve a certain rate of flow.
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I know the metric folks are giggling at these
units. For this video, I’m going to break my
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rule about providing both systems of measurement
because these values are just examples anyway.
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They are just nice round numbers that are easy
to compare with no real application outside the
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demo. Substitute your own preferred units if you
want, because it won’t affect the conclusions.
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There are a few methods engineers use to estimate
the energy losses in pipes carrying water,
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but one of the simplest is the Hazen-Williams
equation. It can be rearranged in a few ways,
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but this way is nice because it has the variables
we can measure. It says that the head loss (in
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other words the drop in pressure from one end of a
pipe to the other) is a function of the flow rate,
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and the diameter, length, and roughness of
the pipe. Now - that’s a lot of variables,
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so let’s try an example to show how this works.
First, we’ll investigate the effect the length
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of the pipe has on head loss. I’m starting
with a short piece of pipe in the manifold,
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and I’m testing everything at three flow rates:
0.3, 0.6, and 0.9 gallons per minute (or gpm).
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At 0.3 gpm, we see pressure drop across the pipe
is practically negligible, just under half an
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inch. At 0.6 gpm, the head loss is about an inch.
And, at 0.9 gpm, the head loss is just over 3
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inches. Now I’m changing out the sample for a much
longer pipe of the same diameter. In this case,
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it’s 20 times longer than the previous example.
Length has an exponent of 1 in the Hazen-Williams
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equation, so we know if we double the length,
we should get double the head loss. And if we
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multiply the length times 20, we should see the
pressure drop increase by a factor of 20 as well.
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And sure enough, at a flow rate of 0.3 gpm, we
see a pressure drop across the pipe of 7.5 inches,
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just about 20 times what it was with the short
pipe. That’s the max we can do here - opening
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the valve any further just overwhelms the
differential pressure gauge. There is so much
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friction and turbulence in this long pipe that I
would need a different gauge just to measure it.
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Length is just one factor that influences the
hydraulics of a pipe. This demo can also show
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how the pipe diameter affects the pressure
loss. If I switch in this pipe with the same
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length as the original sample but which has
a smaller diameter, we can see the additional
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pressure drop that occurs. The smaller pipe
has ⅔ the diameter of the original sample,
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and diameter has an exponent of 4.9 in our
equation. That’s because, as I mentioned before,
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changing the diameter changes the fluid velocity,
and friction is all about velocity. We expect the
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pressure drop to be 1 over (⅔)^4.9 or about 7
times higher than the original pipe. At 0.3 gpm,
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the pressure drop is 3 inches. That’s
about 6 times the original. At 0.6 gpm,
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the pressure drop is 7.5 inches, about
7 times the original. And at 0.9 gpm,
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we’re off the scale. All of that is to say, we’re
getting close to the correct answers, but there’s
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something else going on here. To explore this
even further, let’s take it to the extreme.
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We’ll swap out a pipe with a diameter 5 times
larger than the original sample. In this case,
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we’d expect the head loss to be 1 over 5^4.3,
basically a tiny fraction of that measured with
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the original sample. Let’s see if this is the
case. At 0.3 gpm, the pressure drop is basically
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negligible just like last time. At 0.6 and 0.9
gpm, the pressure drop is essentially the same as
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the original. Obviously, there’s more to the head
loss than just the properties of the pipe itself,
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and maybe you caught this already. There is
something conspicuous about the Hazen-Williams
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equation. It estimates the friction in a pipe,
but it doesn’t include the friction and turbulence
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that occurs at sudden changes in direction or
expansion and contraction of the flow. These
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are called minor losses, because for long pipes
they usually are minor. But in some situations
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like the plumbing in buildings or my little
demonstration here, they can add up quickly.
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Every time a fluid makes a sudden turn (like
around an elbow) or expands or contracts (like
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through these quick-release fittings), it
experiences extra turbulence, which creates
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an additional loss of pressure. Think of it like
you are walking through a hallway with a turn. You
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anticipate the turn, so you adjust your path
accordingly. Water doesn’t, so it has to crash
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into the side - and then change directions.
And, there is actually a formula for these minor
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losses. It says that they are a function of the
fluid’s velocity squared and this k factor that
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has been measured in laboratory testing for any
number of bends, expansions, and contractions.
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As just another example of this, here’s a sample
pipe with four 90-degree bends. If you were just
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calculating pressure loss from pipe flow, you
would expect it to be insignificant. Short,
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smooth pipe of an appropriate diameter. The
reality is that, at each of the flow rates tested
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in the original straight pipe sample, this one has
about double the head loss, maxing out at nearly
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6 inches of pressure drop at 0.9 gpm. Engineers
have to include “minor” losses to the calculated
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frictional losses within the pipe to estimate the
total head loss. In my demo here, except for the
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case of the 20’ pipe, most of the pressure drop
between the two measurement points is caused by
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minor losses through the different fittings in the
manifold. It’s why, in this example, the pressure
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drop is essentially the same as the original. Even
though the pipe is much larger in diameter, the
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expansion and contraction required to transition
to this large pipe make up for the difference.
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One clarification to this demo I want to make:
I’ve been adjusting this valve each time to keep
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the flow rate consistent between each example
so that we make fair comparisons. But that’s not
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how we take showers or use our taps. Maybe
you do it differently, but I just turn the
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valve as far as it will go. The resulting flow
rate is a function of the pressure in the tap
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and the configuration of piping along
the way. More pressure or less friction
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and turbulence in the pipes and fittings
will give you more flow (and vice versa).
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So let’s tie all this new knowledge
together with an example pipeline.
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Rather than just knowing the total
pressure drop from one end to another,
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engineers like to draw the pressure continuously
along a pipe. This is called the hydraulic grade
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line, and, conveniently, it represents the
height the water would reach if you were to tap
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a vertical tube into the main pipe. With a
hydraulic grade line, it’s really easy to see
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how pressure is lost through pipe friction.
Changing the flow rate or diameter of the pipe
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changes the slope of the hydraulic grade line.
It’s also easy to see how fittings create minor
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losses in the pipe. This type of diagram
is advantageous in many ways. For example,
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you can overlay the pressure rating of the pipe
and see if you’re going above it. You can also
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see where you might need booster pump stations
on long pipelines. Finally, you can visualize how
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changes to a design like pipe size, flow rate,
or length affect the hydraulics along the way.
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Friction in pipes? Not necessarily the
most fascinating hydraulic phenomenon. But,
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most of engineering is making compromises, usually
between cost and performance. That’s why it’s so
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useful to understand how changing a design can
tip the scales. Formulas like the Hazen-Williams
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and the minor loss equations are just as useful
to engineers designing pipelines that carry
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huge volumes of fluid all the way down to
homeowners fixing the plumbing in their houses.
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It’s intuitive that reducing the length of a pipe
or increasing its diameter or reducing the number
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of bends and fittings ensures that more of the
fluid’s pressure makes it to the end of the line.
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But engineers can’t rely just on intuition.
These equations help us understand how much
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of an improvement can be expected without having
to go out to the garage and test it out like I
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did. Pipe systems are important to us,
so it’s critical that we can design them
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to carry the right amount of flow without too
much drop in pressure from one end to the other.
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It’s time for everyone’s favorite segment of
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me trying to cook while my wife
tries to capture that on video.
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“And… Action!”
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“Who cut this tiny hole in the cheese?”
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Goofing around in the kitchen is one
of our favorite things to do together.
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That’s why we’re thankful for
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PRACTICAL12. Thanks, HelloFresh, and thank
YOU for watching. Let me know what you think.
Practical Engineering
