Quadratics
L.I. To sketch graphs from the form f(x) = a(x-b)^2 + c
S.C. I know that the equation of the line of symmetry is x = b
I know that the turning point (vertex) is the point (b,c)
I know that if a > 0 then it is a minimum turning point and if a < 0 it is a maximum turning point
I can calculate the y-intercept by substituting x = 0 into the function
I can use all of this information to sketch an annotated quadratic function
Advanced Higher
Integration and differential equations.
L.I. To use Newton's Law of Cooling and other differential equations in context that are slightly harder than the simple examples looked at previously
S.C. I can set up the equation from the information given
I can solve the equation using integration and logs as necessary
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