Related International Baccalaureate Maths essays

1. 

   Extended Essay- Math

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2. 

   This portfolio will investigate the patterns and aspects of infinite surds. Technologies, graphs, and ...

   Right now, we know that for the expression to be an integer, "k" has to be the product of any two consecutive integers, and we also know that . Now, we will consider a special case for k. When, the value of the expression should also be infinity.

1. 

   Infinite summation portfolio. A series is a sum of terms of a sequence. A ...

   For T8 Once more the graph is moving towards a certain asymptote and the statement is again Sn = ax. As a special case we can chose x = ?. For T8 The graph shows no difference with the preceding ones and the statement is again Sn = ax.

2. 

   Infinite Summation Internal Assessment ...

   3 3.552263 11.168476 4 2.462241 13.630717 5 1.365356 14.996073 6 0.630929 15.627002 7 0.249901 15.876903 8 0.086609 15.963512 9 0.026681 15.990193 The table above shows a fast increasing value of the sum of the sequence until n=6 as it approaches 16 at a slow rate, which 16 is the horizontal asymptote since = 16.

1. 

   Logarithm Bases - 3 sequences and their expression in the mth term has been ...

   Now that the common difference has been found, we can plot more points on the graph according to the difference in height. Below is a graph with differences by adding the differences graphically, starting from the topmost graph y = . Term (u) Logarithm of 8 with base 2n (c)

2. 

   Infinite Summation Portfolio. I will consider the general sequence with constant values

   The graph should look like this: 0 1 1 1,69314718 2 1,93337369 3 1,9888778 4 1,99849593 5 1,99982928 6 1,99998332 7 1,99999857 8 1,99999989 9 1,99999999 10 2 Table 2: Shows the values of the graph of against of After using the computer programme Graphmatica, the result of the graph

1. 

   Infinite Summation - In this portfolio, I will determine the general sequence tn with ...

   2.997113 + = 2.999555 S7 = S6 + t7 = 2.999555 + = 2.999938 S8 = S7 + t8 = 2.999938 + = 2.999991 S9 = S8 + t9 = 2.999991 + = 2.999997 S10 = S9 + t10 = 2.999997 + = 2.999998 Now, using Microsoft Excel, I will

2. 

   In this portfolio, I will determine the general sequence tn with different values of ...

   This time I want my a=4 and my x=1,2,3 and 4, and I want to have in the range of , from calculating this sequence I will be able to find a general statement for this sequence. In order to comment on the relation between (4,x)