If #(8z-9)(8z+9) = az^2-b#, what is the value of #a#?

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Answer 1 · 2018-03-30T17:15:50

#a = 64#

difference of two squares identity:

#(a+b)(a-b) = a^2-b^2#

this means that #(8z-9)(8z+9) = (8z)^2 - 9^2#

#= 64z^2 - 81#

this can be shown by expanding brackets (FOIL) rule:

F (firsts): #8z# and #8z#
#8z * 8z = 64z^2#

O (outsides): #8z# and #9#
#8z * 9 = 72z#

I (insides): #-9# and #8z#
#-9 * 8z = -72z#

L (lasts): #-9# and #9#
#-9 * 9 = -81#

#(8z-9)(8z+9) is found by adding these products together:

#64z^2 + 72z - 72z - 81#

#72z# and #-72z# cancel each other out (add to #0#).

the result is #64z^2 - 81#.

in the question, #az^2 - b = 64z^2 - 81#

so #a = 64#.