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  1. 3

    Mathematical Induction question

    What's with all the notation ambiguity? First off, if read conventionally, it would mean (tana) to the power of -1 [tan(n+1)a-tan(na)]. So, is it that or the multiplication of (tana) to the power of -1 with the other term [tan(n+1)a-tan(na)]? Another thing is the meaning of (tana)^-1. No...
  2. 3

    Urgent! Inductions Question

    Since the question doesn't explicitly say that you have to use induction to solve it (although induction is much simpler), you can also use an analytical method to prove this result. [Syntax: a | b means b is divisible by a] Now, from the question, 2 | n, and we need to prove that 8 | n^2 + 2n...
  3. 3

    Quadratic Function

    A different method that doesn't involve simultaneous equations is by observing that the value of the x-intercepts are already given, i.e. roots are x = 0,4. Therefore, Sum of roots = 0 + 4 = 4 Product of roots = 0 * 4 = 0. By definition, f(x) = x^2 - (Sum of roots)x + (Product of roots) f(x) =...
  4. 3

    double differentiation question

    Well, I dunno about the previous solution (not that I have anything against it, really) but here's how I look at it: To determine the coefficients of terms in an nth degree polynomial, you need at least (n+1) distinct equations in terms of the coefficients. This rule is quite obvious. For...
  5. 3

    Potential symmetry (for matrices)

    Um...yeah, but consider the following: Let A be the (non-symmetric) matrix: {0 4} {1 0} The characteristic polynomial is (t - 2)(t + 2), therefore t = -2,2. Eigenvectors are given by the equation: {t -4}{a} = 0 {-1 t}{b} Solving it generally gives the eigenvectors as x = (-2b,b) and (2b,b)...
  6. 3

    Potential symmetry (for matrices)

    xD....i'm not up to that level yet, have mainly been concentrating on algorithms (i.e. direct/iterative methods for solving systems of linear equations), but thanks anyways, i'll try to look through it when i'm free.
  7. 3

    Potential symmetry (for matrices)

    A symmetric matrix is one that is equal to its transpose, i.e. A = A^T. Consider the following 3-by-3 matrix: { 0 0 1 } { 1 0 0 } { 0 1 0 } It can be seen that this is not a symmetric matrix. However, by interchanging rows (2) and (3), the matrix: { 0 0 1 } { 0 1 0 } { 1 0 0 } is obtained. This...
  8. 3

    Extension One Revising Game

    Its asking you to prove that 1/1! + 1/2! + 1/3! + 1/4! + .... < 103/60 + 1/((e^5)*(e-1)) using the given formula 1/n! > 1/e^n; n > 5. Easier to prove LHS < RHS rather than RHS > LHS.
  9. 3

    Extension One Revising Game

    Nope, there is no end. The whole point of the ... means it goes on to infinity. However, since it is a convergent infinite series, it has a finite value, which you don't need to calcuate, but just prove that LHS < RHS, using the given formula.
  10. 3

    4U Revising Game

    In that case, you could just add up the first few terms, i.e. the first 5 terms to get a value > 1.45, then claim because 1 + 1/2^2 + 1/3^2 + 1/4^2 + 1/5^2 < 1 + 1/2^2 + 1/3^2 + ... + 1/99^2, 1 + 1/2^2 + 1/3^2 + ... + 1/99^2 > 1.45.
  11. 3

    Extension One Revising Game

    f(x)= [4/(x-1)] - 2 ; x<1. Let f(f^-1(x)) = x x = [4/(f^-1(x)-1)] - 2 x + 2 = 4/(f^-1(x)-1) f^-1(x) - 1 = 4/(2+x) f^-1(x) = 1 + 4/(2+x) f^-1(x) = (6+x)/(2+x) New question: Given that 1/n! > 1/e^n; n > 5, prove that 1/1! + 1/2! + 1/3! + 1/4! + .... < 103/60 + 1/((e^5)*(e-1)).
  12. 3

    Extension One Revising Game

    Yes it is, draw the graph, take out the retangles and you'll find that its true. Its done by considering the areas under the graph (which is what the question asks you to do), and since one is obviously smaller than the other, so yeah, as far as i know, its valid.
  13. 3

    4U Revising Game

    Well, to prove that 1.45 < 1 + 1/2^2 + 1/3^2 + ...+1/99^2, consider the graph of 1/x^2. From the graph, I{1->100} 1/x^2 < 1 + 1/2^2 + 1/3^2 + ... + 1/99^2, that is taking the higher/left value of the function values as the retangle height, i.e. if function values are 1/n^2 and 1/(n+1)^2...
  14. 3

    4U Revising Game

    Um....for n = 1, you get 1.45 < 1, which is false. So does 1.45 < 1 + 1/2^2 + 1/3^2 + ...+1/n^2 <1.99 say that it is true for any arbitary n, or are you talking about the limiting sum of 1 + 1/2^2 + 1/3^2 + ...+1/n^2?
  15. 3

    4U Revising Game

    When n = 1, LHS = 1 RHS = 2 - 1/1 = 1 Since LHS <= RHS, it is true for n = 1. Assume that it is true for n = k, i.e. 1 + 1/2^2 + 1/3^2 + ...+1/k^2 <= 2-1/k Consider 1 + 1/2^2 + 1/3^2 + ...+1/k^2 + 1/(k+1)^2 <= 2 - 1/k + 1/(k+1)^2 = 2 - 1/k + 1/(k+1)(k+1) <= 2 - 1/k + 1/k(k+1) ---(because k+1...
  16. 3

    4U Revising Game

    New question: The equation x^3 + px - 1 = 0 has three real, non-zero roots a,b,c. Find the value of: a^2 + b^2 + c^2 a^4 + b^4 + c^4 and hence show that p must be strictly negative.
  17. 3

    4U Revising Game

    Actual question: show that for x>0, x- x^3/3 < inverse tan x < x- x^3/3 + x^5/3. Let f(x) = arctan(x) - x + (x^3)/3 f'(x) = 1/(1+x^2) - 1 + x^2 f'(x) = (1+(x^4-1))/(1+x^2) f'(x) = (x^4)/(1+x^2) Therefore, f'(x) > 0 for x > 0. f(0) = arctan(0) - 0 + 0 f(0) = 0 Since f'(x) > 0 for x > 0, f(x) >...
  18. 3

    Extension One Revising Game

    Very classic question xD.... Proof: I{n->n+1} 1/x represents the actual area. By considering the graph of f(x) = 1/x, f(n) > f(n+1) Area of retangle with length f(n) > Area of retangle with length f(n+1), both having length of 1 unit. Therefore, 1/n * 1 > 1/(n+1) * 1 1/n > 1/(n+1). From the...
  19. 3

    4U Revising Game

    If so, then x - x^3/3 < x - x^3/3 - x^5/3. 0 < -x^5/3, which cannot be true since x > 0. Is there something wrong?
  20. 3

    4U Revising Game

    if so, then the first condition a/b >= c/a doesn't fit in the first place, so that line is correct. Beyond that, its crap
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