Answer:
Step-by-step explanation:
SOLUTION:
Apply the difference of squares formula α2−β2=(α−β)(α+β) with α=4b and β=c2:
(16b2−c4)=(4b−c2)(4b+c2)
Thus, 16b2−c4=(4b−c2)(4b+c2).
Answer: 16b2−c4=(4b−c2)(4b+c2)
Copyright © 2024 EHUB.TIPS team's - All rights reserved.
Answers & Comments
Answer:
Step-by-step explanation:
SOLUTION:
Apply the difference of squares formula α2−β2=(α−β)(α+β) with α=4b and β=c2:
(16b2−c4)=(4b−c2)(4b+c2)
Thus, 16b2−c4=(4b−c2)(4b+c2).
Answer: 16b2−c4=(4b−c2)(4b+c2)
- c4 + 16b2
= (c2 + 4b)(-c2 + 4b)
Answer:
(c2 + 4b)(-c2 + 4b)