12 of 32 Items .... Type: Raw Pure Math
Problems, Questions, and Puzzles to spark discussion and argument in the maths classroom.
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Algebra 2:
Write a function for this graph ...
Estimation:
What are some possible values for a,b,c,d?
If I told you it also went through (0,54), what might the leading coefficient be?
.: [ALG2], [Jennifer Wilson], [Raw Pure Math].
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If we stipulate that
\( (x+12)^2+(y+4)^2+(z+3)^2=0\), then
\( \sqrt{x^2+y^2+z^2}=?\)
Should we brute-force this or is there a more beautiful or subtle way of getting what we want?
.: [PRE-CALC], [David Marain], [Raw Pure Math].
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Is there enough information to determine the least possible value of y?
.: [PRE-CALC], [SAT], [Raw Pure Math].
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Can you find values for y that will make each answer true? Generalize the rules in effect here.
.: [ALG2], [SAT], [Raw Pure Math].
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Raw, pure math. Ummmmmm, tasty.
But can you make the question harder by rearranging the variables?
.: [GEOM], [mathsjem], [Raw Pure Math].
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For the last couple of days, I've been asking you to create a new puzzle. Today, I'd like you to describe HOW to create a puzzle with a unique solution, or two solutions, or three. How did Don Steward create these and KNOW that they only had one solution?
.: [ALG2], [Don Steward], [Raw Pure Math].
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Put algebraic expressions into the cells so that the product is as indicated. That's for warm-up.
That's not what I'm going to ask you to do, though ...
Make a new puzzle with two solutions.
.: [ALG2], [Don Steward], [Raw Pure Math].
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Put integers into the cells so that their product is as indicated.
.: [MS Math], [Don Steward], [Raw Pure Math].
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list all possible ordered pairs (a,b).
What are a couple of different ways to approach this nugget?
What are the "obvious" answers that everyone will miss?
.: [ALG2], [David Marain], [Raw Pure Math].
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Is this enough information to find the equation?
.: [ALG2], [T.R.Milne], [Raw Pure Math].
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Let's examine the function g(n):
g(n) = smallest integer such that g(n)*n! is a perfect square.
How should we go about finding if there's a pattern in that?
.: [PRE-CALC], [James Tanton], [Raw Pure Math].
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Is there an easy way to tell if those lines will have one solution, no solution, or an infinite number of solutions?
.: [ALG1], [T.R.Milne], [Raw Pure Math].