WP QUADS PRO
WP QUADS PRO

a DIY valve overdrive pedal : goldie

In an amongst the guitar building I decided to break out the soldering iron to build an overdrive pedal – as light relief. I had stumbled across the “Valvecaster” schematic and layout at Beavis Audio.

This is a very simple circuit that uses a 12AU7 valve, running at a low voltage. Because it is running at such low voltage it is very easy to overdrive.

The schematic specifies an operating voltage of 9v but I decided to bump it up to 12v to give a fraction more headroom. I chose one from the tangle of old wall-warts I have tucked away in a drawer. It could use a battery but I suspect that the current draw for heating the valve would suck a PP9 dry in a matter of minutes.

If you search for “valvecaster” at Youtube, you’ll find plenty of examples of the pedal in action. One of the common comments is that this is a naturally “dark” sounding pedal. This was not exactly what I was after and so I was going to experiment with different types of tone stacks. As laid out in the schematic it includes a simple treble cut tone control. Even turned up full this would only make the pedal darker, allowing treble frequencies to escape to earth. I decided, initially, to build it with no EQ, and then add it later. One of the results of this was that it is not a dark pedal at all. It is wonderfully balanced and punchy just as it is, and it’ll not be getting any additional EQ added. To remove the tone control I just eliminated the 10nF capacitor (C2) and the A100k potentiometer (VR2).

I reused an old enclosure I had laying around, which I shot with a coat of black nitro-cellulose and a very light top coat of gold (both left over from my Shaftesbury restoration). The gold coat is thin enough to allow just a hint of the black to show through.

The chemistry geeks amongst you may, by now, have worked out where the inspiration for the name and colour came from.

I have yet to print up and apply the decals for the pedal but there’s the standard 1/4″ input and output jacks round the back. The top has the valve, a true-bypass footswitch and the power toggle switch. On the front, left to right, are the gain, a dummy pot (filling up a surplus hole in the old enclosure) and the output volume.

When I was buying the parts for this I also got hold of a 12AT7 valve. This works well too. It is more subtle and has less gain, but in some ways is all the better for it; smoother, warmer and just a bit less wild.

You can listen to a quick demo of Goldie with the 12AU7, that I recorded for my friend Alfie Lanos, who was really helpful in helping me plan this one out.

It was recorded on my mobile phone so the sound quality is not the best, but gives you an idea of what the pedal does.

Ressence’s Type 3 Watch

At 30 large this isn’t a watch any of us mortals will be buying anytime soon, but the design of the Ressence Type 3 is fascinating enough that you’ll want to take a look. First off you’ll notice there’s no crown; all adjustments are made on the back of the watch, which is actually a series of concentric dials.

As if that wasn’t cool enough , take a close look at the display:

It practically looks like the graphics are projected onto that curved surface, no? Reading the description of how they pulled that off clues you in as to why the price tag is so lofty.

The indications and their mechanisms are mounted inside a bubble crafted from extremely tough, anti-reflective sapphire crystal. The complication and indications follow the shape of the crystal.

The mechanism (28 gears, 57 jewels 🤯 ) is enclosed in an upper compartment filled with a naphtha-type liquid that has a more similar index of refraction to the sapphire crystal than air does. Refraction bends light when it passes from one material to another, e.g. air-to-glass or glass-to-air. With the fluid-filled dial indications, refraction is greatly minimised, which tricks the brain into seeing the dial in two-dimensions rather than three. A thermal valve automatically adjusts for any expansion or contraction of the fluid. For $30,000 I’d like a guy in a tuxedo to follow me around with a flashlight, illuminating the dial whenever I raise my wrist in a dim environment. Instead Ressence uses Super-LumiNova, a non-radioactive, non-toxic photoluminescent pigment manufactured in Japan, for the engraved indications.

Oh yeah, and they’re only making 50 of these.

ᴡʀɪᴛᴛᴇɴ ʙʏ: ʀᴀɪɴ ɴᴏᴇ

What saddens a narcissist?

LOSING GRADE A SUPPLY.

I will try to explain…

A narc can feel sadness but the experience of feeling sad is extremely stunted and restricted.

Sadness serves a purpose. It’s a feeling we all try to avoid but it’s inevitable and a part of life. Sadness rarely ends with sadness. It’s followed with a lot of reflection and maybe internalizing what caused us to feel sad. It’s a loss of something or someone. It brings about memories and puts things into perspective. Healthy minded people are able to process their sadness and discover what really matters to them, what’s important, what isn’t and maybe how they contributed to some of their own sadness.

A narc can’t do this. Their sadness starts at I feel sorry for me and stays at I feel sorry for me. That’s it. They don’t feel sad for a situation and they don’t feel sad for someone else. They don’t reflect and internalize their sadness. They don’t move past the sadness ……well not entirely true, it moves to, how dare you!


What makes a narc sad?


THE LOSS OF GRADE A SUPPLY. Especially if the grade A supply left them first and goes no contact. They will feel very sorry and sad for themselves. Don’t be confused though, they are not sad at losing the person, they are sad at losing the way the supply made them feel and look. They are sad they have lost that high end hit. If they can’t replace their grade A supply through another target, they will feel sorry for themselves.

As degrading as it sounds, narcs have their supply ranked as what gives them the most high. They have smaller hits from lower rank and higher hits from higher rank. Some of their supply is on standby for when they’re more desperate and can’t get the more fulfilling hit…imagine like they can’t get their favourite ice cream because it’s temporarily out of stock so they’ll settle for a generic hit until they can get the high end hit later.

Narcs are not going to ever be ok with losing any supply really BUT losing their grade A supply will make them sad. Again, don’t be confused, their sadness is not genuine out of love, care or concern…..it’s all about them. They are not capable of feeling sad for the people that they hurt.

ᴡʀɪᴛᴛᴇɴ ʙʏ: ᴛʀᴀᴄʏ ʜᴇʀʀɪᴍᴀɴ

Ferrite Transformer Turns

  • Ferrite core turns ratio calculation 
  • Push pull topology ferrite core turns ratio calculation with example 
  • Ferrite transformer primary turns calculation
  • Ferrite transformer secondary turns calculation

In this article you will learn how to calculate turns ratio of ferrite core transformer for high frequency switch mode power supply inverters. High ferrite core transformers are used in almost every power electronics circuits like inverters and pure sine wave inverters. They are used to boost up or step up low dc voltage of battery and other dc sources like solar panels. Ferrite core transformers are also used in isolated dc to dc converters to step up or step down dc voltage. For example in isolated buck converter it is used to step down dc voltage and in isolated boost converter, they are used to step up dc voltage. In this article, we will learn how to calculate turns ratio of high frequency ferrite core transformer with examples.

Ferrite core turns ratio calculation 

For example in boost up stage we have two options to use from power electronics converters, push pull topology and full bridge. I will explain both methods one by one.  Turns ratio calculation formula and concept remains same for both topologies. The only difference between push pull topology and full bridge transformer design is that push pull ferrite core transformer requires a center tap in primary winding. In other words, push pull transformer have two times primary turn than full bridge transformer.

Push pull topology ferrite core turns ratio calculation with example 

Let’s start with example. For example we want to design a 250 watt boost up dc to dc converter. We are using push pull topology for this design. We are using 12 volt battery. We want to step up dc voltage from 12 volt 310 volt. Switching frequency of design is 50KHz. We are using ETD39 ferrite core which can handle 250 watt. It is beyond the scope of this topic to tell how to select ferrite core according to power rating. I will try to write separate article on it.  The output of ferrite core will be always high frequency square wave of 50 KHz. We need to use full rectifier to convert it into dc of 310 volt. You may also need to use LC filter to harmonics or AC components from output.

Ferrite Transformer Turns Calculation

Ferrite transformer primary turns calculation

As you know battery voltage does not remain same all the time.  As the load on battery on increases, battery voltage will be less than 12 volt. With no load with fully charged battery, battery voltage will be near to 13.5 volt.  Therefore input voltage is not constant, we must consider it while calculating turns ratio of ferrite core transformer. Cut off voltage for battery is usually 10.5 volt.  We can take it as smallest possible value of input voltage to boost up dc converter. So we have following parameters now:

Vinput = 10.5 volt

Vout = 310 volt

as we know that formula of turns ratio calculation in transformer is:

N = Npri / Nsc = Vin / Vout

Where Npri is number of primary turns and Nsc is number of secondary turns. We have three know variables like turns ratio which can be calculated by above equation, input voltage and output voltage. But we need to calculate primary turns to find secondary turn of ferrite core transformer. Formula to calculate primary turns for ferrite core transformer is given below:

Npri = Vin * 10^8 / 4 * f * Bmax * Ac

But for push pull it will be half the primary number of turns.

  • Where Npi is primary number of turn, Vin( nom) is normal input voltage which in our example is 10.5 volt.
  • Bmax is maximum flux density. The unit of maximum flux density is Guass. Remember if you are using Tesla unit for maximum flux density, IT = 10^4 Guass. The value of maximum flux density is usually given in data sheet ferrite core. We usually take value of Bmax between 1300G to 2000G.  This is usually a acceptable range for all ferrite core transformers.  Note : High value of flux density will saturate the core and low value of flux density will lead to core under utilization. For example we will take 1500G for dc to dc converter example.
  • f is switching frequency converter. In our example switching frequency of dc to dc converter is 50 KHz.
  • Ac is effective cross sectional area of ferrite core. We have to refer data sheet for this value. In this example, we are using ETD39 core. The effective cross sectional area of ETD39 is 125mm^2 or 1.25cm^2.

We have all the values to calculate primary number of turns .i.e.

Vin = 10.5 volt, Bmax = 1500G, f = 50 KHz, Ac = 1.25 cm^2

By putting these parameters in two above formula, we can calculate turns primary number of turns.

Npri = 12 . 10^8 / 4 . 50000 . 1500 . 1.25  = 3.2

Hence Npri  = 3.2 But we cannot use fractional turns. So we need to round off primary turns calculated value into nearest whole number 3. The nearest possible whole number is 3. primary number of turns for ferrite core is 3. But before that we need check either for Npri = 3 Bmax is within acceptable range or not. As I have mentioned above the acceptable range for Bmaz is 1300-2000G. But the question is why we need to check the value of Bmax again? Because we adjust the value of primary turns from 3.2 to 3. So let’s calculate value of Bmax for Npri = 3 by using above forumla.

Bmax = Vin * 10^8 / 4 * f * Npri * Ac

Bmax = 12 * 10^8 / 5 * 50000 * 3 * 1.25 = 1600G

So calculated value of Bmax is 1600G which is within acceptable range of maximum flux density. Its mean we can take Npri = 3 for further calculations. Primary number of turns for push pull ferrite center tap transformer is 3 turns + 3 turns. In any design you will need to adjust the value of Npri if it is in fraction. You can easily adjust it. But you need to check value of Bmax every time. We start with assume value of Bmax and calculated Npri. But you can also start with assume value of Npri and check the value of maximum flux density Bmax. For example suppose a value of Npri =1 and check the value of Bmax and keep repeating this process, until it is become in acceptable range.

Ferrite transformer secondary turns calculation

Now let’s move to secondary turn of ferrite core. In our design the output of dc to dc converter is 310 volt at any input voltage. Input voltage is variable from 10.5 volt to 13.5 volt. We will need to implement feedback to get regulated 310 output voltage. So we will take little bit higher value of output voltage so that at minimum possible input we can still get output voltage of 310 volt by changing the duty cycle of PWM. So we should design a ferrite core transformer with secondary rated at 330 volt.  Feedback will adjust the value of output voltage by changing the duty cycle of PWM.  You should also take care of losses and voltage drops across switching devices and you should take them into account while designing transformer.

So transformer must be able to supply 330 volt output with input of 13.5 volt to 10.5 volt.  The maximum duty cycle for PWM is 98% and rest 2% is left for dead time. During minimum possible input voltage duty cycle will be maximum.  At maximum duty cycle of 98%, input voltage to transformer is 0.98 * 10.5 = 10.29 volt.

By using voltage ratio formula of transformer = voltage ratio = 330 / 10.29 = 32.1. Voltage ratio and turns ratio in transformer is equal to each other. Hence N = 32.

So we know all values to calculate secondary turns of ferrite core transformer.

N = 32, Npri = 3

Nsec = N * Npri = 32 *3 = 96

So number of primary turns is equal to 3 and number of secondary turns is equal to 96. So it is all about turns ratio calculation for high frequency transformers. If you have any issue, let me know with your comments.