Investigate the effects of the half-lifes of the isotopes of cobalt on the mass of a mystery lump of the element.
Get some practice using big and small numbers in chemistry.
Work in groups to try to create the best approximations to these physical quantities.
Explore how can changing the axes for a plot of an equation can lead to different shaped graphs emerging
Many physical constants are only known to a certain accuracy. Explore the numerical error bounds in the mass of water and its constituents.
An introduction to a useful tool to check the validity of an equation.
Investigate some of the issues raised by Geiger and Marsden's famous scattering experiment in which they fired alpha particles at a sheet of gold.
Investigate why the Lennard-Jones potential gives a good approximate explanation for the behaviour of atoms at close ranges
See how the motion of the simple pendulum is not-so-simple after all.
Find out why water is one of the most amazing compounds in the universe and why it is essential for life. - UNDER DEVELOPMENT
An article about the kind of maths a first year undergraduate in physics, engineering and other physical sciences courses might encounter. The aim is to highlight the link between particular maths. . . .
Find out how to model a battery mathematically
This is the area of the advanced stemNRICH site devoted to the core applied mathematics underlying the sciences.
Ever wondered what it would be like to vaporise a diamond? Find out inside...
When a mixture of gases burn, will the volume change?
Dip your toe into the world of quantum mechanics by looking at the Schrodinger equation for hydrogen atoms
Work out the numerical values for these physical quantities.
How does the half-life of a drug affect the build up of medication in the body over time?
Read all about electromagnetism in our interactive article.
Where will the spaceman go when he falls through these strange planetary systems?
A ball whooshes down a slide and hits another ball which flies off the slide horizontally as a projectile. How far does it go?
Find the equation from which to calculate the resistance of an infinite network of resistances.
Follow in the steps of Newton and find the path that the earth follows around the sun.
How fast would you have to throw a ball upwards so that it would never land?
Can you work out the natural time scale for the universe?
How high will a ball taking a million seconds to fall travel?
Problems which make you think about the kinetic ideas underlying the ideal gas laws.
Estimate these curious quantities sufficiently accurately that you can rank them in order of size
A look at the fluid mechanics questions that are raised by the Stonehenge 'bluestones'.
Gravity on the Moon is about 1/6th that on the Earth. A pole-vaulter 2 metres tall can clear a 5 metres pole on the Earth. How high a pole could he clear on the Moon?
Explore the Lorentz force law for charges moving in different ways.
Look at the units in the expression for the energy levels of the electrons in a hydrogen atom according to the Bohr model.
A look at a fluid mechanics technique called the Steady Flow Momentum Equation.
What is an AC voltage? How much power does an AC power source supply?
Have you got the Mach knack? Discover the mathematics behind exceeding the sound barrier.
Can you match up the entries from this table of units?
Show that even a very powerful spaceship would eventually run out of overtaking power
A simplified account of special relativity and the twins paradox.
This is the technology section of stemNRICH - Core.
Explore the power of aeroplanes, spaceships and horses.
Can you arrange a set of charged particles so that none of them start to move when released from rest?
Some explanations of basic terms and some phenomena discovered by ancient astronomers
Derive an equation which describes satellite dynamics.
A look at different crystal lattice structures, and how they relate to structural properties
Explore the energy of this incredibly energetic particle which struck Earth on October 15th 1991
A think about the physics of a motorbike riding upside down
Things are roughened up and friction is now added to the approximate simple pendulum
Look at the calculus behind the simple act of a car going over a step.
Explore the rates of growth of the sorts of simple polynomials often used in mathematical modelling.
Find out some of the mathematics behind neural networks.