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Matrices Rows R Columns C Multiplying a (3R 2C) by (2R 1C) makes a.... |
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Matrices Rows R Columns C Multiplying a (1R 3C) by (3R 1C) makes a.... |
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(1R 1C) i.e a single number |
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[image] Let f(x) = x2 + (k+1)x - k - 2, where k is a constant. Find the value of k for which f(x) = 0 has equal roots |
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Simplify (a - b)2 - (a + b)2 |
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"Difference of Two Squares" [F-S][F+S] [(a - b) - (a +b)][(a - b) + (a + b)] [ -2b ][ 2a ] -4ab Alternatively, expand the brackets and gather terms: [a2 - 2ab + b2] - [a2 + 2ab + b2] = -4ab |
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1a3 + 3a2b + 3ab2 + 1b3
a goes down in Power, while b goes up, the coefficients come from Pascal's Triangle, with all the signs Plus |
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1 1 1 1 2 1 1 3 3 1 1 4 6 4 1 1 5 10 10 5 1 ...is called ... ...is useful for ... ...and the next row reads ... |
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Pascal' Triangle Coeffiecients of Expansions 1 6 15 20 15 6 1 |
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Without using a calculator, solve the simultaneous equations x + y + z = 2 2x + y + z = 3 x - 2y + 2z = 15 |
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Numerator can be factored, but it does not have any factors common to Denominator …so use the Quotient Rule (U over V)
Second by Deriv of First …minus …. First by Deriv of Second …All Over ….Second Squared |
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“from First Principles” means use the f(x+h) method Steps Write out f(x) Write out f(x+h) Simplify f(x+h) – f(x) Divide all by h Get the Limit as ‘h goes to 0’ |
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Solve the Simultaneous Equation 2x - 3y = 1 x2 + xy -4y2 = 2 |
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One is Linear, One is Quadratic Re-arrange the Linear (usually to get x=) Substitute into Quadratic Solve Quadratic (to get y=number) Sub back into Linear (to get x values) |
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Write the recuring decimal 0.979797... as an infinite geometric series and hence as a fraction |
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Answer is obviously 97/99 (using 'non-Geometric' method!) Geometric: .63 + .0063 + .000063 ... 63/100 + 63/10000 + 63/1000000 ... a = 63/100, r = 1/100 (-1<r<1) Then S(infinity) formula |
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Formula? Arithmetic Series Nth Term |
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Formula? Nth Term Geometric Series |
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Formula? Sn of an Arithmetic Series |
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Forumula? Sn of a Geometric Series |
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Difference between Arithmetic and Geometric Series? |
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Arithmetic: b - a = c - b Geometric: b/a = c/b |
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Formula? Sum to Infinity of a Geometric Series? |
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Solve x3 + 3x2 – 4x – 12 = 0 |
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This is a Cubic Equation, so use the Factor Theorem! Solutions are x = ±2, -3 |
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Use matrix methods to solve the simultaneous equations 2x + y = 8 x - 3y = -3 |
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Prove by induction that... |
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Prove that is it true for the First Term (typically n=1 but sometimes n=0) Assume that the statement is true for P(k) Use P(k) to prove that P(k+1) is also true ...and make the concluding statements |
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Prove by Induction ...Types and Tricks Sum of Series |
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Sum of Series: e.g. 12 + 22 + 32 ...+ k2 = [k(k+1)(k+2)]/6 12 + 22 + 32 ...+ k2+(k+1)2= [(k+1)(k+2)(k+3)]/6 Now prove that [k(k+1)(k+2)]/6 +(k+1)2 = [(k+1)(k+2)(k+3)]/6 |
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The equation of a curve is y = 3x4 -2x3 -9x2 +8 (i) Show that the curve has a local maximum at the point (0, 8). (ii) Find the coordinates of the two local minimum points on the curve. (iii) Draw a sketch of the curve. |
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Get First Deriv, and solve = 0 Establish that (0,8) is a Turning Point ...i.e. x=0 is a solution for dy/dx=0, and (0,8) is on the curve Get Second Deriv "Local Maximum" implies Second Deriv value <0 so sub given value of x into d2y/dx2 to see if this is the case (ii) Use the other two solutions from dy/dx=0; Sub into y to get co-ords Sub into d2y/dx2 to establish the type of turning point |
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Use integration methods to derive a formula for the volume of a cone. |
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-10 < x-3 < 10-10+3 < x-3+3 < 10+3 -7 < x < 13 |
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Let z = -1 + i and use De Moivre’s theorem to evaluate z5 |
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Polar Form: z = r(cos θ + i sin θ) DeMoivre: zn = rn(cos nθ + i sin nθ) [image] |
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Three numbers are in arithmetic sequence. Their sum is 27 and their product is 704. Find the three numbers |
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You could use x, x+d, x+2d …but much better to use x-d, x, x+d Sum: (x-d)+(x)+(x+d) = 3x= 27 so x= 9 Product: (9-d)(9)(9+d) = (9)(92 – d2) 9(81-d2)=704 (81-d2)=704/9 -d2 =704/9 - 81 -d2 =704/9 - 9(81)/9 -d2 = (704 - 729)/9 -d2 = (704 -729)/9 -d2 = (-25)/9 d = ±5/3 So the numbers are 71/3, 9, 102/3 |
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The parametric equations of a curve are: x = cos t + t sin t, y = sin t – t sin t, where 0< t < π /2.Find dy/dx and write your answer in its simplest form. |
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| x = cos t + t sin t dx/dt = -sin t + t cos t + sin t . (as t sin t is a Product) dx/dt = t cos t y = sin t – t sin t dy/dt = cos t – (-t cos t + cos t) dy/dt = t sin t Then dy/dx = dy/dt by dt/dx = tan t |
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α and β are the roots of the equation x2 – 4x + 6 = 0. (i) Find the value of 1/α + 1/β(ii) Find the quadratic equation whose roots are 1/α and 1/β |
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| (i) x2 – 4x + 6 = 0x2 – (α + β)x + (αβ) = 0α + β = 4 and αβ = 61/α + 1/β = (β + α)/(αβ) = 4/6 = 2/3(ii) x2 – (sum of roots)x + (product of roots) = 0x2 – (1/α + 1/β)x + (1/αby 1/β)= 0x2 – 2/3 x + 1/6 = 06x2 – 4x +1 = 0 |
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"Difference of Two Cubes" (x - y)(x2 - xy - y2) |
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"Sum of Two Cubes" (x + y)(x2 + xy + y2) |
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Formula for Roots of a Quadratic Equation? |
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Solve the equation iz2 +(2 − 3i)z + (− 5 + 5i) = 0 . |
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Use the Quadratic Root formula, with a = i ; b =(2 − 3i) ; c = (− 5 + 5i) |
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One Root of 4 x2 - 2x - 1 = 0 is 1 + √5 4 What is the other root? |
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The other root is 1 - √5 4 The other root is the Conjugate ...in the case where the coefficients of the quadratic are Real |
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k is a real number such that -1 + i √3 = ki -4√3 - 4i |
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Multiple above and below by the Conjugate of the Denominator: -1 + i √3 x -4√3 + 4i -4√3 - 4i -4√3 + 4i |
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Sum of Two Squares ...can only be factored with Complex Numbers (a + ib)(a - ib), where i2 = -1 |
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Find the General Term in the expansion of [image] |
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The General Term found by simplifying [image]
with the [image] part being set to some value k |
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Find the equation of the tangent to the curve 3x2 + y2 = 28 at the point (2, – 4). |
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Eq: (y - y1) = m(x - x1) with m = dy/dx and (x1, y1) = (2, -4) Note in this case that the d/dx of 2y2 is (2y)(dy/dx) |
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f(x) = loge3x – 3x, where x > 0. Show that (1/3, – 1) is a local maximum point of f(x). |
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First Derivative: f'(x) = (1/x) - 3 Second Derivative: f''(x) = (-1/x2) Show that x=1/3 is a solution for f'(x) = 0 and that f'(x)<0 ...and that f(1/3) = -1 |
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Find the vlaues of n where (2n −1)ln 3 < 12 loge 27 |
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(2n −1)ln 3 < 12 loge 27 (2n −1)ln 3 < 12 ln 33 (2n −1)ln 3 < 12. 3ln 3 (2n −1)ln 3 < 36 ln 3 (2n −1) < 36 |
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Taking 1 as a first approximation of a root of x3 + 2x − 4 = 0, use the Newton Raphson method to calculate a second approximation of this root. |
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Newton Raphson method: [image] |
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Prove by Induction ...Types and Tricks DeMoivre's Theorem |
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Assume P(k): (cos θ + i sin θ)k = cos kθ + i sin kθ RTP P(k+1): (cos θ + i sin θ)k+1 = cos (k+1)θ + i sin (k+1)θ But (cos θ + i sin θ)k+1 = (cos θ + i sin θ)k(cos θ + i sin θ)1 Use Assumption = (cos kθ + i sin kθ)(cos θ + i sin θ) Multiply, gather Real and Imaginary terms Recognise Expansion Formula from Page 9 Table etc. |
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The equation of a curve is y = 3x4 - 2x3 - 9x2 + 8 Show that the curve has a local maximum at the point (0, 8). Find the coordinates of the two local minimum points on the curve. Draw a sketch of the curve. |
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f'(x) = 0 at x = 0 (where f''(x) <0 Local Max); f'(x) = 0 at x = 3/2 (where f''(x) >0 Local Min); f'(x) = 0 at x = -1 (where f''(x) >0 Local Min).[image] |
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Find the equations of the Asymptotes of the graph of f(x) = 1_ x+1 |
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(Denominator x+1 → 0) Therefore Vertical Asymptote is x = -1 Limit as x → ∞ of 1(x+1) is 0 Therefore Horizontal Asymptote is y = 0 Note this graph has neither Turning Points nor Points of Inflexion |
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The shaded region is bounded by the line, the curve and the x-axis. Calculate the area of this region. [image] |
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This FlashCard Set was produced by David Kearney, (c) 2008 (E&OE!) It is released under Creative Commons, for free use in not-for-profit classrooms. Some images were snapped from http://www.examinations.ie/ For this and more ICT advice for Teachers in Irish schools visit http://homepage.eircom.net/~ictadvisor Many thanks to the team at Flash Card Machine for making this resource available |
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