As someone with bad handwriting, I can say it is a 1.
I get that there are a lot of gTLDs, but I am surprised many people think ml stands for Marxist-Leninist instead of the more likely option of being a national TLD. Yeah, there's su for the Soviet Union, but it's hard for me to imagine a TLD referring to anything remotely left in a capitalist dominated world. It costs $185K (soon to be $227K) just for the application alone to create a new gTLD, and it costs several thousand per quarter along with a transaction fee per registered domain after 50,000 being registered to keep it available. Plus the application process is restricted to organizations, not individuals. It's hard to imagine ml being bought and created by a Marxist-Leninist organization when that amount of money would be going to something so trivial and pointless instead of being used towards any activist project.
Maybe if your citizens weren't struggling for food, more people could buy shitty AAA games.
This smug lib is a contrarian troll.
https://hexbear.net/comment/5541326
I learned Hyperbola is moving to its BSD derivative kernel, HyperBK, on this thread, and it will be GPL.
It sets a precedent of banning maintainers and other contributors from nations in the Global South and nations declared enemies of NATO. This goes against open source philosophy, and this will lead to China and other nations needing to develop their own sovereign forks or kernels from scratch.
It's similar to the US working to ban RISC-V to stop China from using an open source instruction set to become more technologically sovereign. Restricting open source software from NATO's enemies is essentially NATO shooting themselves in the foot in the long term. NATO is sanctioning an enemy, so the enemy is incentivized to build alternatives to tech they lost (which can be forked easily), and then the alternatives become popular and challenge NATO's tech, which is not competing where over 30% of manufacturing industry exists, which leads to NATO's tech and industry crumbling as it cannot dominate the market like it was able to before and further accelerates the Empire's decline.
This is a good comment on this thread that explains the long term consequences more comprehensively than what I did: https://hexbear.net/comment/5541448
They're the people who take the code from thousands of developers, check it for errors, make sure there are no regressions, coordinate the code with the patches from other maintainers from further up and down the tree, and finally herd the patches toward the mainline, as well as manage backports.
It's essentially another term for developer, but a developer which maintains/administrates a project and analyzes, coordinates, and governs the patches (changes to code) that are applied to a project, especially a large one like Linux, Rust, Git, etc. where multiple maintainers are needed.
https://docs.kernel.org/maintainer/feature-and-driver-maintainers.html
If the Russian and/or Chinese kernel maintainers decide to work on a sovereign kernel project, I'm definitely cloning their repo and will hopefully help with the project as long as the US Empire doesn't stop me. Because the US keeps ruining my career and technical libre hobbies, I hope to move to China at this point.
Assuming the first way is written correctly, the equation is actually 6 / (2 * (1 + 2)). The (1 + 2) is still inside the denominator. So it is solved as follows:
6 / (2 * (1 + 2))
6 / (2 * 3)
6 / 6
1
The second equation incorrectly takes out the (1 + 2) and places it as the numerator on the side. In order to take that piece out correctly, it would have to be: (6 / 2) * (1 / (1 + 2))
And to solve it, it would look like as follows:
(6 / 2) * (1 / (1 + 2))
3 * (1 / (1 + 2))
3 * (1 / 3)
3 / 3
1
Also, 3 * 3 = 9 in regards to second incorrect equation (incorrect meaning the second incorrectly refactored equation from the pic that you answered correctly up until the last operation).
I think The_sleepy_woke_dialectic forgot to put parentheses around the denominator, but I believe it was meant to be interpreted as the entire denominator as shown in the pic.