Monday, 17 June 2013
Sunday, 16 June 2013
front to back
you could start these tasks by exploring what happens to a 2-digit number when the front digit is put to the back and the two numbers are (a) added and (b) subtracted
and what happens with a 2-digit number if you square them first and then subtract?
establish that the result will always divide by 9 and by 11
and what happens with a 2-digit number if you square them first and then subtract?
establish that the result will always divide by 9 and by 11
Saturday, 15 June 2013
squares in squares
find relationships between the (integer) lengths of the squares
what is the smallest (integer) length of side of the big square?
what is the smallest (integer) length of side of the big square?
Friday, 14 June 2013
puzzles that you could use algebra to solve
a variety of old puzzles, with thanks to David Wells and other puzzle collectors
Tuesday, 11 June 2013
simultaneous stairs
[ I was reminded of these neat results following an ATM/MA session in Birmingham recently ]
hollow square
in Napoleonic battles a hollow square was a popular formation for an infantry battalion e.g. Wellington's army at Waterloo, to cope with cavalry charges
not Wellington's army...
a recreation of Wellington's army hollow square formations
for a battalion of 960 people, how many possible hollow square arrangements are there?
state the widths for each
if you want to start off with an easier number of people, find the 3 options for each of:
for a battalion of 960 people, how many possible hollow square arrangements are there?
state the widths for each
if you want to start off with an easier number of people, find the 3 options for each of:
- 48
- 45
- 80
Thursday, 6 June 2013
making squares
two integer numbers, 'a' and 'b' sum to a square number
and
double the first, add the second makes another square number
what (integer) values could 'a' and 'b' have?
for example, a = 9, b = 7 works
try to find several values
and maybe general rules
e.g. for when the two square numbers are consecutive
and
double the first, add the second makes another square number
what (integer) values could 'a' and 'b' have?
for example, a = 9, b = 7 works
try to find several values
and maybe general rules
e.g. for when the two square numbers are consecutive
Tuesday, 4 June 2013
geometry steering algebra
Hans Freudenthal advocates utilising the compelling image of a straight line when teaching directed numbers (e.g. in chapter 15 of 'Didactical Phenomenology of Mathematical Structures')
in Freudenthal's words:
'the justification of the numerical operations and their laws by the simplicity of the algebraic description of geometrical figures and relations'
a rule e.g. y = 5 - x generates some points by inputting some positive x values
if these points are joined and this part of the line is then extended into the negative quadrants
some (directed number) calculation results emerge
this work is better managed with talk but the resource intends to nudge in the right direction
in Freudenthal's words:
'the justification of the numerical operations and their laws by the simplicity of the algebraic description of geometrical figures and relations'
a rule e.g. y = 5 - x generates some points by inputting some positive x values
if these points are joined and this part of the line is then extended into the negative quadrants
some (directed number) calculation results emerge
this work is better managed with talk but the resource intends to nudge in the right direction
mega quadratic equations
these questions are very similar to one in the NCTM (US) 1988 'Ideas of Algebra' yearbook posed by Terry Goodman and Martin P Cohen
Sunday, 2 June 2013
with or without algebra?
there is an interesting article by Prof. Andrew Hacker in the New York Times (July 28th 2012) questioning the value of algebra teaching
this seems to be a Romans v Greeks debate
the Romans, apparently, interested themselves (initially at least) in the practical and everyday uses of the subject: utilitarianism
the Greeks, seemingly, viewed the subject more aesthetically and as a subject of considerable beauty
the Romans, apparently, interested themselves (initially at least) in the practical and everyday uses of the subject: utilitarianism
the Greeks, seemingly, viewed the subject more aesthetically and as a subject of considerable beauty
other numbers of nets
it is fairly easy to prove that there are only 2 different nets for a tetrahedron, by considering where edges can be broken
e.g. using Polydron
the octahedron has 11 different nets, the same as the cube:
and a square based pyramid has 6:
e.g. using Polydron
the octahedron has 11 different nets, the same as the cube:
and a square based pyramid has 6:
Wednesday, 29 May 2013
equivalent things
the intention of this first resource is that students plug in the given input values
and then, maybe with some nudging, appreciate that there are shorter rules that give the output numbers from the input numbers
and that these simpler expressions can be obtained by cancelling the algebraic fraction
these resources involve justifying then creating equivalent (same only look different) expressions to the one in the middle
there is at least one solution to these:
and then, maybe with some nudging, appreciate that there are shorter rules that give the output numbers from the input numbers
and that these simpler expressions can be obtained by cancelling the algebraic fraction
these resources involve justifying then creating equivalent (same only look different) expressions to the one in the middle
there is at least one solution to these:
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