Answer:
The simplified value of the given linear expression is 8 x + 5
Step-by-step explanation:
Given as :
The linear expression is
× (14 x - 2) - × ( - 4 x - 24 )
Now, Simplifying the equation
taking common 2 and 4
×[ 2× (7 x - 1)] - ×[4× ( - x - 6 )]
Or, ×[(7 x - 1)] - ×[( - x - 6 )]
Or, 1 ×[(7 x - 1)] - 1 ×[( - x - 6 )]
Or, 7 x - 1 + x + 6
Or, (7 x + x) + ( - 1 + 6)
Or, 8 x + ( 5)
Or, 8 x + 5
So, The simplified value of the given linear expression is 8 x + 5 . Answer
The space between the walls are very smalll
Our current list has 11!/2!11!/2! arrangements which we must divide into equivalence classes just as before, only this time the classes contain arrangements where only the two As are arranged, following this logic requires us to divide by arrangement of the 2 As giving (11!/2!)/2!=11!/(2!2)(11!/2!)/2!=11!/(2!2).
Repeating the process one last time for equivalence classes for arrangements of only T's leads us to divide the list once again by 2
Answer:
Step-by-step explanation:
To find the matrix A, took all the numeric coefficient of the variables, the first column is for x, the second column for y, the third column for z and the last column for w:
And the vector B is formed with the solution of each equation of the system:
To apply the Cramer's rule, take the matrix A and replace the column assigned to the variable that you need to solve with the vector b, in this case, that would be the second column. This new matrix is going to be called .
The value of y using Cramer's rule is:
Find the value of the determinant of each matrix, and divide:
Answer:
70
Step-by-step explanation: