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. 

   This essay will examine theoretical and experimental probability in relation to the Korean card ...

   and October. Graph 2. Tree Diagram of Ddang-9 P(1) = (2/20) x (3/19) x (1/18) x (1/17) = 1/1292 P(2) = (2/20) x (2/19) x (1/18) x (16/17) = 16/29070 P(3) = (2/20) x (13/19) x (1/18) x (17/17) = 13/3420 P(all)

2. 

   Infinite Summation Internal Assessment ...

   This is the first example where = 3 and = 3, (3, 5) a x n t Sn 3 3 0 1.000000 1.000000 1 3.295837 4.295837 2 5.431270 9.727107 3 5.966860 15.693968 4 4.916450 20.610417 5 3.240763 23.851180 6 1.780171 25.631351 7 0.838165 26.469516 8 0.345307 26.814823 9 0.126453 26.941276

1. 

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

   is 5. Also, as , We go on with : And now, to find S10 for : After drawing the relation between Sn and n for (with Excel 2010)

2. 

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

   of 3] = Now, the expression , should provide us with the values of each term in the sequence. Thus, to prove as the expression for the second row of sequences in the form : un = First term of the sequence = = log3n 81 (Taking the first term as u1 and so on,)

1. 

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

   Shows the sum of the first 10 terms for After analysing the previous results the sum of the first terms of the above sequence for is 2. Likewise, we can represent the relationship between and in a graph by replacing the values of in the y-axis and the values of in the x-axis can do this.

2. 

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

   4,968956 6 4,993095 7 4,998645 8 4,999761 9 4,999961 10 4,999993 From this graph we can see that as , the value of n increases as well, but it does not exceed 5, thus the greatest value of this relationship will be 5 and therefore the domain of this relationship is , as n approaches .