solve using Matlab please

Now, we will turn our attention to functions, I(x), which are compositions of other functions, but we it may not help to think of them as transformations of some other function. Below you will find three tables that are partially filled. You will need to complete them To do so. you will need to create some expression, differentiate it, factor the result etc and then record something in the table. Here it goes 1.The Power rule for computing derivatives says dida (x)=2x. So we are going to assume that d/dx( g(x)A2)) contains 2gfx), and look at examples to see if we are right We will also look to see what else is there. To complete the first row, the Matlab commands below were used syms x a b g(x) (x) f(xg(x)2; f(x) diff(f()x) ksimplify(diff(f(x,x)/(2 gx Modify the commands above to complete the table. Table 1 g0x) beax (ax+b 2 a (aseb) Of course, to get anything out of this exercise, you will need to relate the function kx) in each row back to the g(x) in that row 2. Consider the function gox)-x2-3x. You will work with the function (g(x))An for each of the values of n given in the first column. Again, Matlab commands were used to generate the values in the first row of the table (after the header). syms x g(x) f(x) g(x)x2-3x n*(gt-1)(n-1 subs (diEf(g(x),)-1 subs (diff(f(x)-1 Modity them (as little as possible) to complete the remainder of the table. Table 2 91-1) Now, we will turn our attention to functions, I(x), which are compositions of other functions, but we it may not help to think of them as transformations of some other function. Below you will find three tables that are partially filled. You will need to complete them To do so. you will need to create some expression, differentiate it, factor the result etc and then record something in the table. Here it goes 1.The Power rule for computing derivatives says dida (x)=2x. So we are going to assume that d/dx( g(x)A2)) contains 2gfx), and look at examples to see if we are right We will also look to see what else is there. To complete the first row, the Matlab commands below were used syms x a b g(x) (x) f(xg(x)2; f(x) diff(f()x) ksimplify(diff(f(x,x)/(2 gx Modify the commands above to complete the table. Table 1 g0x) beax (ax+b 2 a (aseb) Of course, to get anything out of this exercise, you will need to relate the function kx) in each row back to the g(x) in that row 2. Consider the function gox)-x2-3x. You will work with the function (g(x))An for each of the values of n given in the first column. Again, Matlab commands were used to generate the values in the first row of the table (after the header). syms x g(x) f(x) g(x)x2-3x n*(gt-1)(n-1 subs (diEf(g(x),)-1 subs (diff(f(x)-1 Modity them (as little as possible) to complete the remainder of the table. Table 2 91-1)