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What are the advantages of doing cross boarder mergers and acquisitions (1 page)

a. Previous cases of successful cross border M&A in the Gulf (1 page)

b. Previous cases of companies that collapsed in the Gulf but could have survived if they had went for the option of cross boarder mergers and/or acquisitions. (1 page)

c. Detailed analysis of Amazon acquiring Souq and the advantages gained for both parties. (1 page)

d. Determinant of success for cross boarder mergers and acquisitions. (1 page)

e. Discussion on the need for cross border M&A in today’s competitive market (1 page)

How Does the Fibonacci Sequence Relate to Nature and Other Math Processes? Nature is surrounding us, and in light of the fact that I invest a considerable measure of energy outside I have possessed the capacity to appreciate and watch all that nature brings to the table. Because of the way that I adore science and finding how everything around me capacities and identifies with everything else, I chose to explore the connection that Fibonacci has with other math forms—and additionally with the earth. I needed to see how plants know the most ideal approach to frame their seeds or external shell, and why a few examples may rehash in nature in various plants and natural materials. Consequently, this investigation takes a gander at two apparently inconsequential themes—Fibonacci and the brilliant proportion—both of which deliver a similar number, phi. While this could be negligible occurrence, that probability is invalidated when the way that the number delivered is silly is presented. It was this unconventional disclosure, and in addition the inexhaustible appearances of Fibonacci in nature, that drove me to pick this investigation subject. To start, I should begin by distinguishing what at first started my interest in this subject: a pinecone. Similarly as with numerous different plants, and foods grown from the ground, pinecones show the brilliant proportion. To all the more likely comprehend what I am discussing I have incorporated a photo of a pinecone like the one that I initially examined. "Spirals2"Labeled underneath is the detectable winding example on the pinecone. Including the quantity of spirals that bearing produces the number eight, and in the other heading it creates the number thirteen while a third and more tightly winding produces twenty-one. These numbers are situational to the pinecone in the photos, yet the Fibonacci numbers all in all are much more mind boggling than they initially give off an impression of being. To comprehend the significance of these numbers it is urgent to comprehend the basics of the Fibonacci grouping itself. The grouping for the most part starts with the numbers 1, 1, 2, 3, 5, 8, 13 and takes after an effortlessly perceptible example. 1, 1, 2, 3, 5, 8, 13 Begin with the number 5, or the nth number in the arrangement. We'll call it ""n. 5 rises to the two numbers previously it included: 2 + 3. Or on the other hand, in more extensive terms, a number in the grouping is the total of the two numbers going before it. 1, 1, 2, 3, 5, 8, 13""n = ""n-1 + ""n-2 A fascinating thought comes up at the say of this equation however. "" "" ="" This proportion just so happens to square with a number frequently documented as"", or phi. "" > 1/11Phi is more noteworthy than one, "" < 2/12but under two. "" > 3/21.5Phi is more noteworthy than three parts, "" < 5/31.666but under five thirds. "" > 8/51.6Phi is more noteworthy than eight fifths, "" < 13/81.625but under thirteen eights. """" 1.6180339988… You'll see that each portion recorded above is comprised of numbers from the first seven number arrangement, at the end of the day, each combine of Fibonacci numbers makes a proportion that draws nearer and closer to phi as the numbers increment. This is better appeared on a chart I made, showed beneath. "" The proportion made by these arrangements as they approach phi is known as the brilliant proportion. The brilliant proportion, be that as it may, isn't as vital to this investigation as the lesser known idea of the brilliant point. The following is a portrayal of the brilliant proportion in connection to the brilliant point, the littler segment of the circle recorded utilizing alpha, or α. "Fibonacci "" α = 137.507764° "" 137.5° The reason this change is vital is on account of the brilliant point is available in the following talk theme: sunflowers. Or then again, more particularly, their seeds. Sunflowers are another awesome case of the presence of Fibonacci in nature, and furthermore drove me to an intriguing revelation. To plot the appropriation of a sunflower's seeds we require a X and a Y arrange match. Utilizing the square roots from a file numbered from balanced thousand and increasing them by the cosine of the radian of the point alpha gives us a recipe to discover x, reliant on the record number utilized. Y can be figured with a fundamentally the same as equation, utilizing sine rather than cosine. The conditions are recorded completely underneath. "" "" At the point when these recipes are utilized and contribution to Microsoft Excel they create a chart like the accompanying. "" Goodness! That diagram looks to some extent like the first Fibonacci spirals that showed up in the pinecones, and as said prior it isn't negligible incident. While the utilization of the brilliant proportion is clear, there is another part of it that I wish to address, the brilliant winding. Its formulae are given by the accompanying conditions, and are promptly obvious in nature also (nautilus shells for instance). "" "" In these conditions "" is the undetermined scaling element and "" is the development factor of the winding. In the example of the brilliant winding, "" is equivalent to the task underneath. "" At first, these formulae gave off an impression of being a peculiar sprinkling of numbers, and one I didn't comprehend by any means. In any case, after seeing the presence of a characteristic sign in the equation for "" I made an association with the letter "", otherwise called Euler's number, that is available in both the X and Y formulae. After intensive pursuits of numerous sources I found another math procedure that uncovers likeness to the above formulae. "" This is Euler's recipe. It turns out to be progressively evident that its likeness isn't incidental when the recipe is changed into the last equation demonstrated as follows. "" While the visual likenesses might be clear when the recipe is shown as it is over, the significance of every factor can be illuminated with basic clarifications. "" is the self-assertive scaling factor, in charge of deciding the size of the winding. "" directs the revolution of the winding, and stays consistent. The "" in "" manages the development of the winding, and the "" directs the speed—together speaking to the speed of the development of the winding. All the more basically, any given arranged match can be found by increasing the development of the winding by its pivot (as appeared in the initially given formulae for finding said facilitates.) What is delivered, in any case, subsequent to contributing more than two thousand bits of information, got from the directions figured utilizing the formulae above, into Microsoft Excel, is appeared in the chart underneath. "" In the wake of putting in the Fibonacci squares (utilizing the first brilliant proportion) into the winding its appearance and connection to Fibonacci turn out to be significantly clearer. "Brilliant>

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