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1. concavity 2. concavity the second deriviative measures the change in slope with respect to x, this is known as concavity 3. concavity the second deriviative measures the…
1. concavity 2. concavitythe second deriviative measures the change in slope with respect to x,this is known as concavity 3. concavitythe second deriviative measures the…
concavity concavity the second deriviative measures the change in slope with respect to x, this is known as concavity concavity up concave is curve the,0 if …
1. geometrical applications of differentiationthe first derivative 2. geometrical applications of differentiationddythe first derivative y, f x , f x…
1. the slope of a tangent to a curve 2. the slope of a tangent to a curvey y f xx 3. the slope of a tangent to a curve y y f x px k 4. the slope of…
1. the slope of a tangent to a curve 2. the slope of a tangent to a curve yy f x x 3. the slope of a tangent to a curveyy f xpx k 4. the slope of a…
1. calculus rules 2. calculus rules1. chain rule d ndx u nu n1 u 3. calculus rules1. chain rule d ndx u nu n1 u “bring down…
1. calculus rules 2. calculus rules d 2. product rule uv uv vu dx 3. calculus rules d 2. product rule uv uv vu dx “write down…
1. differentiability 2. differentiabilitya function is differentiable at a point if the curve is smooth continuous i.e. lim f x lim f x …
1. differentiability 2. differentiability a function is differentiable at a point if the curve is smooth continuous i.e. lim f x lim f x …
limits & continuity limits & continuity a limit describes the behaviour of functions. limits & continuity a limit describes the behaviour of functions. lim…
1. limits & continuity 2. limits & continuity a limit describes the behaviour of functions. 3. limits & continuity a limit describes the behaviour of functions.…
1. rules for differentiation 2. rules for differentiation(1) y c 3. rules for differentiation(1) y cf x c 4. rules for differentiation(1) y cf …
1. rules for differentiation 2. rules for differentiation (1) y c 3. rules for differentiation (1) y c f x c 4. rules for differentiation (1) y c f…
calculus rules calculus rules 3. quotient rule 2 d u vu uv dx v v calculus rules 3. quotient rule “square the bottom, write down the…
rates of change e.g. a block of ice in the form of a cube has one edge 10 cm long. it is melting so that its dimensions decrease at the rate of 1 mm/s. at what rate is the…
calculus rules calculus rules 3. quotient rule 2 d u vu uv dx v v calculus rules 3. quotient rule “square the bottom, write down the…
8/6/2019 concavity and q-concavity 1/183.2.2 quadratic forms: conditions for definitenessdefinitionsrelevant questions when we use quadratic forms in studying the concavity…
cavity, concavity cavity – bounded connected component of background (a hollow in an object) concavity - concave shapes of the contour of an object. 2d hole = 2d cavity…
7/28/2019 generalized concavity 1/3457/28/2019 generalized concavity 2/3459generalized concavityb ^7/28/2019 generalized concavity 3/345books in the classics in applied mathematics…