Amarr
Amarr
5.00
Basic Baldi
Last Active:
1 day ago
Birthday:
Dec 6, 2018 (6 years old)
Next Birthday:
Dec 6, 2025 (88 days remaining)
Combat Metrics
Kills
1,318
Losses
367
Efficiency
78.2%
Danger Ratio
78.2%
ISK Metrics
ISK Killed
1231.64B ISK
ISK Lost
53.51B ISK
ISK Efficiency
95.8%
ISK Balance
1178.13B ISK
Solo Activity
Solo Kills
14
Solo Losses
124
Solo Kill Ratio
1.1%
Solo Efficiency
10.1%
Other Metrics
NPC Losses
10
NPC Loss Ratio
2.7
Avg. Kills/Day
0.5
Activity
Very High
Character Biography
WRONG ANSWERS MAKE ME MAD
If x and y are rational numbers, then how would you prove that x\xd7x-y\xd7y is also rational?
If x+y=3 and xy+yx=27. What are x and y?
If x+y+z=π, what is x−y+z?
Consider the equation x2+y2=3z2. Are there any other integer solutions besides the solution where x=y=z=0 ?
In triangle ∆ABC, let G be the centroid, and let I be the center of the inscribed circle. Let α and β be the angles at the vertices A and B, respectively. Suppose that the segment IG is parallel to AB and that β = 2 tan^-1 (1/3). Find α.
If 3x−y=12, what is the value of 8x \\ 2y ?
24x2+25x−47 \\ ax−2 = −8x−3− 53 \\ ax−2 is true for all values of x≠2 \\ a, where a is a constant.
What is the value of a?
If ships enter Thera at an average rate of r ships per minute and each stays in the wormhole for average time of T minutes, the average number of ships in the wormhole, N, at any one time is given by the formula N=rT. This relationship is known as Little's law.
CCP estimates that during peak hours, an average of 3 ships per minute enter the wormhole and that each of them stays an average of 15 minutes. CCP uses Little's law to estimate that there are 45 ships in the wormhole at any time.
Little's law can be applied to any spot inside Thera, such as a particular sig, anom or pvp event. CCP determines that, during peak hours, approximately 84 ships per hour complete an activity and each of these ships spend an average of 5 minutes each activity. At any time during peak hours, about how many ships, on average, are participating in an activity inside Thera?
Let f be a continuous real-valued function on R\xb3. Suppose that for every sphere S of radius 1, the integral of f(x, y, z) over the surface of S equals 0. Must f(x, y, z) be identically 0?
Determine all possible values of the expression A\xb3 + B\xb3 + C\xb3 — 3ABC where A, B, and C are nonnegative integers.
If x and y are rational numbers, then how would you prove that x\xd7x-y\xd7y is also rational?
If x+y=3 and xy+yx=27. What are x and y?
If x+y+z=π, what is x−y+z?
Consider the equation x2+y2=3z2. Are there any other integer solutions besides the solution where x=y=z=0 ?
In triangle ∆ABC, let G be the centroid, and let I be the center of the inscribed circle. Let α and β be the angles at the vertices A and B, respectively. Suppose that the segment IG is parallel to AB and that β = 2 tan^-1 (1/3). Find α.
If 3x−y=12, what is the value of 8x \\ 2y ?
24x2+25x−47 \\ ax−2 = −8x−3− 53 \\ ax−2 is true for all values of x≠2 \\ a, where a is a constant.
What is the value of a?
If ships enter Thera at an average rate of r ships per minute and each stays in the wormhole for average time of T minutes, the average number of ships in the wormhole, N, at any one time is given by the formula N=rT. This relationship is known as Little's law.
CCP estimates that during peak hours, an average of 3 ships per minute enter the wormhole and that each of them stays an average of 15 minutes. CCP uses Little's law to estimate that there are 45 ships in the wormhole at any time.
Little's law can be applied to any spot inside Thera, such as a particular sig, anom or pvp event. CCP determines that, during peak hours, approximately 84 ships per hour complete an activity and each of these ships spend an average of 5 minutes each activity. At any time during peak hours, about how many ships, on average, are participating in an activity inside Thera?
Let f be a continuous real-valued function on R\xb3. Suppose that for every sphere S of radius 1, the integral of f(x, y, z) over the surface of S equals 0. Must f(x, y, z) be identically 0?
Determine all possible values of the expression A\xb3 + B\xb3 + C\xb3 — 3ABC where A, B, and C are nonnegative integers.