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Which is the solution of the quadratic equation (4y - 3)2 = 72?
y
3 +/Z and y
y=
3-6/2
4
3+62
y=
and y=
-3 – 6/2
4
4
0
y=
9/2
4
and y= -3/2
4
9/2
4.
y=
3/2
and y=
4​

Which is the solution of the quadratic equation 4y 32 72y3 Z and yy3624362yand y3 62440y924and y 324924y32and y4 class=

Respuesta :

altavistard

Answer:

Step-by-step explanation:

Let's solve (4y - 3)^2 = 72 for y.  To do this, take the square root of both sides.  This yields:

4y - 3 = ±√72 = ±√(36·2) = ±6√2

Then 4y = 3 ±6√2, or

       3 ± 6√2

y = ----------------

             4

The required solution of quadratic equation is y = (3±6√2)/4. Option A is correct.


Solution of the quadratic equation (4y - 3)2 = 72 to be determine.


What is quadratic equation?

Quadratic equation are the equation having maximum power 2.

Here,
(4y - 3)² = 72
4y-3 = ±√72
4y = ±√72 +3
y = (3 ± 6√2)/4


Thus, The required solution of quadratic equation is y = (3±6√2)/4.


Learn more about quadratic equation here:
https://brainly.com/question/2263981

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