Which of the following is the best estimate of the area of the irregular shape?

The best estimate of the area of the irregular shape is

Step-by-step explanation:

see the attached figure to better understand the problem

To know an estimate of the area of the figure calculate the area of the rectangle minus the squares marked with x

so

therefore

The best estimate of the area of the irregular shape is

A

(2a2 +  12a) -  7  = 0  

Step  2  :

Trying to factor by splitting the middle term

2.1     Factoring  2a2+12a-7  

The first term is,  2a2  its coefficient is  2 .

The middle term is,  +12a  its coefficient is  12 .

The last term, "the constant", is  -7  

Step-1 : Multiply the coefficient of the first term by the constant   2 • -7 = -14  

Step-2 : Find two factors of  -14  whose sum equals the coefficient of the middle term, which is   12 .

     -14    +    1    =    -13  

     -7    +    2    =    -5  

     -2    +    7    =    5  

     -1    +    14    =    13  

Observation : No two such factors can be found !!

Conclusion : Trinomial can not be factored

Equation at the end of step  2  :

 2a2 + 12a - 7  = 0  

Step  3  :

Parabola, Finding the Vertex :

3.1      Find the Vertex of   y = 2a2+12a-7

Parabolas have a highest or a lowest point called the Vertex .   Our parabola opens up and accordingly has a lowest point (AKA absolute minimum) .   We know this even before plotting  "y"  because the coefficient of the first term, 2 , is positive (greater than zero).  

Each parabola has a vertical line of symmetry that passes through its vertex. Because of this symmetry, the line of symmetry would, for example, pass through the midpoint of the two  x -intercepts (roots or solutions) of the parabola. That is, if the parabola has indeed two real solutions.  

Parabolas can model many real life situations, such as the height above ground, of an object thrown upward, after some period of time. The vertex of the parabola can provide us with information, such as the maximum height that object, thrown upwards, can reach. For this reason we want to be able to find the coordinates of the vertex.  

For any parabola,Aa2+Ba+C,the  a -coordinate of the vertex is given by  -B/(2A) . In our case the  a  coordinate is  -3.0000  

Plugging into the parabola formula  -3.0000  for  a  we can calculate the  y -coordinate :  

 y = 2.0 * -3.00 * -3.00 + 12.0 * -3.00 - 7.0

or   y = -25.000

Parabola, Graphing Vertex and X-Intercepts :

Root plot for :  y = 2a2+12a-7

Axis of Symmetry (dashed)  {a}={-3.00}  

Vertex at  {a,y} = {-3.00,-25.00}  

a -Intercepts (Roots) :

Root 1 at  {a,y} = {-6.54, 0.00}  

Root 2 at  {a,y} = { 0.54, 0.00}  

Solve Quadratic Equation by Completing The Square

3.2     Solving   2a2+12a-7 = 0 by Completing The Square .

Divide both sides of the equation by  2  to have 1 as the coefficient of the first term :

  a2+6a-(7/2) = 0

Add  7/2  to both side of the equation :

  a2+6a = 7/2

Now the clever bit: Take the coefficient of  a , which is  6 , divide by two, giving  3 , and finally square it giving  9  

Add  9  to both sides of the equation :

 On the right hand side we have :

  7/2  +  9    or,  (7/2)+(9/1)  

 The common denominator of the two fractions is  2   Adding  (7/2)+(18/2)  gives  25/2  

 So adding to both sides we finally get :

  a2+6a+9 = 25/2

Adding  9  has completed the left hand side into a perfect square :

  a2+6a+9  =

  (a+3) • (a+3)  =

 (a+3)2

Things which are equal to the same thing are also equal to one another. Since

  a2+6a+9 = 25/2 and

  a2+6a+9 = (a+3)2

then, according to the law of transitivity,

  (a+3)2 = 25/2

We'll refer to this Equation as  Eq. #3.2.1  

The Square Root Principle says that When two things are equal, their square roots are equal.

Note that the square root of

  (a+3)2   is

  (a+3)2/2 =

 (a+3)1 =

  a+3

Now, applying the Square Root Principle to  Eq. #3.2.1  we get:

  a+3 = √ 25/2

Subtract  3  from both sides to obtain:

  a = -3 + √ 25/2

Since a square root has two values, one positive and the other negative

  a2 + 6a - (7/2) = 0

  has two solutions:

 a = -3 + √ 25/2

  or

 a = -3 - √ 25/2

Note that  √ 25/2 can be written as

 √ 25  / √ 2   which is 5 / √ 2  

It is customary to further simplify until the denominator is radical free.

This can be achieved here by multiplying both the nominator and the denominator by  √ 2  

Following this multiplication, the numeric value of   5 /√ 2 remains unchanged, as it is multiplyed by  √ 2  / √ 2  which equals   1  

  OK, let's do it:

 5 •  √ 2       5 •  √ 2  

—————————————— = —————————————

√ 2  • √ 2          2

Solve Quadratic Equation using the Quadratic Formula

3.3     Solving    2a2+12a-7 = 0 by the Quadratic Formula .

According to the Quadratic Formula,  a  , the solution for   Aa2+Ba+C  = 0  , where  A, B  and  C  are numbers, often called coefficients, is given by :

           - B  ±  √ B2-4AC

 a =   ————————

                     2A

 In our case,  A   =     2

                     B   =    12

                     C   =   -7

Accordingly,  B2  -  4AC   =

                    144 - (-56) =

                    200

Applying the quadratic formula :

              -12 ± √ 200

  a  =    ——————

                     4

Can  √ 200 be simplified ?

Yes!   The prime factorization of  200   is

  2•2•2•5•5  

To be able to remove something from under the radical, there have to be  2  instances of it (because we are taking a square i.e. second root).

√ 200   =  √ 2•2•2•5•5   =2•5•√ 2   =

               ±  10 • √ 2

 √ 2   , rounded to 4 decimal digits, is   1.4142

So now we are looking at:

          a  =  ( -12 ± 10 •  1.414 ) / 4

Two real solutions:

a =(-12+√200)/4=-3+5/2√ 2 = 0.536

or:

a =(-12-√200)/4=-3-5/2√ 2 = -6.536