s + 3 = 6s -s -s ------------- 3 = 5s /5 /5 s=3/5 or s=.6
s3 - 3s2 + 9s - 27 = s2(s - 3) + 9(s - 3) = (s - 3)(s2 + 9) or = (s - 3)(s2 - (9i2) = (s - 3)(s - 3i)(s + 3i) if you want to find for what values of s the expression equals to zero, then this happens when s - 3 = 0 or s - 3i = 0 or s + 3i = 0 s = 3, ±3i
There are 3 1's in 3.
3's are counting by 3's you can count like this 3,6,9,12,15,18,21,24,27,30
If s-5=3 then the value of s is 8 !
s + 3 = 6s -s -s ------------- 3 = 5s /5 /5 s=3/5 or s=.6
s3 - 3s2 + 9s - 27 = s2(s - 3) + 9(s - 3) = (s - 3)(s2 + 9) or = (s - 3)(s2 - (9i2) = (s - 3)(s - 3i)(s + 3i) if you want to find for what values of s the expression equals to zero, then this happens when s - 3 = 0 or s - 3i = 0 or s + 3i = 0 s = 3, ±3i
There are 3 1's in 3.
3's are counting by 3's you can count like this 3,6,9,12,15,18,21,24,27,30
If s-5=3 then the value of s is 8 !
3 sides in a Triangle
s-3
I Saw 3 Ships
s=3 ft
9 = 6 + s - 3 Collect 'like terms' on the RHS (Right hand Side) 7 Hence 9 = 3 + s Subtract '3' from both sides 6 = s or s = 6 The Answer!!!!
s = 5-3 s = 2
Let the side of the base of the box be s Let the height of the box be h The surface area of the box is A = s² + 4sh → h = (A - s²)/4s The the volume of the box is V = s²h = s²(A - s²)/4s = s(A - s²)/4 The volume is a max when dV/ds = 0 dV/ds = d/ds (sA/4 - s³/4) = A/4 - 3s²/4 = 0 → 3s²/4 = A/4 → s² = A/3 → s = √(A/3) → h = (A - s²)/4s = (A - A/3)/(4√(A/3)) = (2A/3)/(4√(A/3)) = ½√(A/3) → V = s²h = (√(A/3))² ½√(A/3) = ½(A/3)√(A/3) = ½(A/3)^1.5 = ½(1300 cm²/3)^1.5 ≈ 4510.28 cm³