a ppt is here
Monday, 29 August 2011
tomato plant heights
a ppt is here
Friday, 26 August 2011
grid triangle areas
work based on this idea by
Threlfall and Pool (2004)
Wednesday, 24 August 2011
Tuesday, 23 August 2011
fibonacci in nature
I'm not a huge fan of digging out maths from nature but this is a great little video
produced by Cristobal Vilo
Monday, 22 August 2011
Sunday, 21 August 2011
parallelogram law
in any parallelogram,
this can be proved using the cosine rule (and cos(180 - A) = - cosA)
but can also be established as an application of pythagoras' rule
and coordinates:
Tuesday, 9 August 2011
Eudoxus' ladder
Eudoxus of Cnidus (now the tip of SW Turkey) was a renowned mathematician (amongst other things) who lived around 400 BC
one of the methods he (reportedly) developed or adopted when studying irrationals was to use a number series (called his 'ladder') in order to approximate to the square root of 2:
how is the 'ladder' formed?
how can it be used to approximate to the square root of 2?
'Reaching the Core of AS Mathematics', available from the ATM, interestingly links this blended recursion 'ladder' to the expansion of:
work out and simplify this expression for n = 2, 3, 4 etc
what has it got to do with Edoxus' ladder and why?
in the limit,
how does this provide an approximation to the square root of 2?
one of the methods he (reportedly) developed or adopted when studying irrationals was to use a number series (called his 'ladder') in order to approximate to the square root of 2:
how is the 'ladder' formed?
how can it be used to approximate to the square root of 2?
'Reaching the Core of AS Mathematics', available from the ATM, interestingly links this blended recursion 'ladder' to the expansion of:
what has it got to do with Edoxus' ladder and why?
in the limit,
how does this provide an approximation to the square root of 2?
Monday, 8 August 2011
lichenometry
people use the diameter or the rate of growth of lichen as a means of dating historical events
formulas have been devised to enable dates to be estimated
simpler formulas assume a circular growth pattern
a Pisa test item (international test, M047) provided a formula used in studies of glaciers
d is the diameter of the 'circle' in mm
t is the number of years after ice has disappeared
the test question asked students to use the formula to find an estimate for a diameter after 16 years
another question might have been:
for what two values of 't' does this formula predict the same numerical value for 'd' as for 't'?
simpler formulas assume a circular growth pattern
a Pisa test item (international test, M047) provided a formula used in studies of glaciers
d is the diameter of the 'circle' in mm
t is the number of years after ice has disappeared
the test question asked students to use the formula to find an estimate for a diameter after 16 years
another question might have been:
for what two values of 't' does this formula predict the same numerical value for 'd' as for 't'?
Tuesday, 2 August 2011
harmonic mean
if one piece of data is an extreme outlier it is recommended to use the harmonic mean to more appropriately represent an 'average' for the data set (but there are problems if one of the items in the data set is zero...)
try this for some simple data sets: compare the arithmetical mean with the harmonic mean where one of the numbers is large or small compared with the rest
for just two numbers, the arithmetical, geometric and harmonic means (along with the root mean square) can be represented by the following lengths:
establish that these lengths are the various means
the harmonic mean of two lengths occurs in the crossed ladders problem - for the height at which two crossed ladders 'meet' (i.e. 'h' from 'A' and 'B')
try this for some simple data sets: compare the arithmetical mean with the harmonic mean where one of the numbers is large or small compared with the rest
for just two numbers, the arithmetical, geometric and harmonic means (along with the root mean square) can be represented by the following lengths:
the harmonic mean of two lengths occurs in the crossed ladders problem - for the height at which two crossed ladders 'meet' (i.e. 'h' from 'A' and 'B')
Subscribe to:
Posts (Atom)