How do you solve #7k ^ { 2} - 48k - 64= 0#?

2 Answers
Sep 16, 2017

#k=8" "# or #" "k = -8/7#

Explanation:

Given:

#7k^2-48k-64 = 0#

We can solve this by completing the square then using the difference of squares identity:

#A^2-B^2 = (A-B)(A+B)#

with #A=(7k-24)# and #B=32#

First multiply by #7# to make the leading term into a perfect square...

#0 = 7(7k^2-48k-64)#

#color(white)(0) = (7k)^2-2(7k)(24)-448#

#color(white)(0) = (7k)^2-2(7k)(24)+24^2-1024#

#color(white)(0) = (7k-24)^2-32^2#

#color(white)(0) = ((7k-24)-32)((7k-24)+32)#

#color(white)(0) = (7k-56)(7k+8)#

#color(white)(0) = 7(k-8)(7k+8)#

Hence #k=8# or #k = -8/7#

Sep 16, 2017

#-8/7# and 8

Explanation:

I use the new Transforming Method (Socratic, Google Search)
#f(k) = 7k^2 - 48k - 64 = 0.#
Proceeding: Solve the transformed equation:
#f'(k) = k^2 - 48k - 448 = 0#
to get its 2 real roots, then, divide them by a = 7.
Compose factor pairs of (ac = -448) --> ...(-4, 112)(-8, 56). This sum is (48 = - b). There fore, the 2 roots of f'(k) are: - 8 and 56.
Back to f(k), the 2 real roots are: #k1 = - 8/a = - 8/7#, and
#k2 = 56/a = 56/7 = 8.#
Answers: - 8/7, and 8.

NOTE . This method can avoid the lengthy factoring by grouping and solving the 2 binomials.