Problem: Write an article based on this summary: Use live baitfish. Try artificial bait. Set up your tackle.

Answer: Flounder respond well to live fish such as minnow, mullet and croakers. Sea worms and clams are also effective. Hook larger baitfish through the lips, and smaller baitfish through the eye.  You can add some strips of fresh squid or live shrimp to vary the bait mix. Hot dogs can also work well. If one type of bait doesn't seem to be working, try another. Flounder can be picky, and they won't always bite, even if they liked a certain type of bait in the past. Consider catching your own live bait in the area where you're fishing for flounder. If live bait is hard to come by in your area, or if you want to vary things up, use red, pink, white or yellow grub-tailed jigs. Sometimes flounder actually prefer artificial bait, so it's a good idea to have some on hand if you aren't having luck with live bait. A medium 7 ft (2.1 m) casting rod is standard for catching flounder. Use line that's sturdy enough to handle larger fish that might take the bait, such as 14 lb (6.4 kg) or so.  Use a circle hook, which is easier for flounder to bite. You'll also need a sinker to make sure the hook is within reach of flounder down below.


Problem: Write an article based on this summary: Wear your hair down. Apply makeup. Hide the hickey.

Answer: If you have long hair, you can simply wear your hair down to cover up hickies on your neck and shoulders. Not everyone will have hair long enough to conceal a hickey. Fortunately, if you do not have long hair, there are still plenty of options to cover up your hickey. While the bruise from a hickey heals, you may want to cover it up so that it is less visible. Try using concealer, foundation, and/or powder to mask the hickey.  Makeup should be chosen carefully to match your natural skin tone.  In a pinch, you might be able to get away with applying toothpaste to the hickey. This will only work if you have a naturally pale complexion, and is much less efficient than makeup. Depending on how you typically dress and what time of year it is, there are many ways you can quickly and easily hide your hickey. The key is hiding the hickey in a way that won't draw attention to it. Try concealing the bruise by wearing:  a bandage  a turtleneck  a collard shirt  a scarf  a hooded sweatshirt  a thick, wide necklace


Problem: Write an article based on this summary: Wait for the right moment. Point out what has currently been bothering you. Set up boundaries with your partner on what you consider cheating. Adopt an open minded and calm persona.

Answer: Find time when both of you are free. Find a private space that is secure and comfortable for a face to face discussion. If you both are too busy or can't find such a place, talking over the phone or web chat is another option. This could be your own jealous feelings to a situation that falls outside the situation such as secretly checking your partners phone to find it locked. Explain to your partner how these situations are affecting you. However, realise that certain actions such as frequently making secret calls that seem suspicious should be brought up at a later date. Tell them what would bother you and tell them to put yourself in your shoes if the situation is reversed would you also be uncomfortable? Never blame or speak in a destructive manner such as 'YOU ARE ALWAYS DOING THIS'.


Problem: Write an article based on this summary: Square a number by multiplying it by itself. For square roots, find the "reverse" of a square. Know the difference between perfect and imperfect squares. Memorize the first 10-12 perfect squares. Simplify square roots by removing perfect squares when possible. Use imaginary numbers for the square roots of negative numbers.

Answer:
To understand square roots, it's best to start with squares. Squares are easy — taking the square of a number is just multiplying it by itself. For instance, 3 squared is the same as 3 × 3 = 9 and 9 squared is the same as 9 × 9 = 81. Squares are written by marking a small "2" above and to the right of the number being squared — like this: 32, 92, 1002, and so on. Try squaring a few more numbers on your own to test this concept out. Remember, squaring a number is just multiplying it by itself. You can even do this for negative numbers. If you do, the answer will always be positive. For example, -82 = -8 × -8 = 64. The square root symbol (√, also called a "radical" symbol) means basically the "opposite" of the 2 symbol. When you see a radical, you want to ask yourself, "what number can multiply by itself to give the number under the radical?" For instance, if you see √(9), you want to find the number that can be squared to make nine. In this case, the answer is three, because 32 = 9.  As another example,  let's find the square root of 25 (√(25)). This means we want to find the number that squares to make 25. Since 52 = 5 × 5 = 25, we can say that √(25) = 5. You can also think of this as "undoing" a square. For example, if we want to find √(64), the square root of 64, let's start by thinking of 64 as 82. Since a square root symbol basically "cancels out" a square, we can say that √(64) = √(82) = 8. Up until now, the answers to our square root problems have been nice, round numbers. This isn't always the case — in fact, square root problems can sometimes have answers that are very long, inconvenient decimals. Numbers that have square roots that are whole numbers (in other words, numbers that aren't fractions or decimals) are called perfect squares. All of the examples listed above (9, 25, and 64) are perfect squares because when we take their square roots, we get whole numbers (3, 5, and 8). On the other hand, numbers that don't give whole numbers when you take their square roots are called imperfect squares. When you take one of these numbers' square roots, you usually get a decimal or fraction. Sometimes, the decimals involved can be quite messy. For instance, √(13) = 3.605551275464... As you've probably noticed, taking the square root of perfect squares can be quite easy! Because these problems are so simple, it's worth your time to memorize the square roots of the first dozen or so perfect squares. You'll come across these numbers a lot, so taking the time to learn them early can save you lots of time in the long run. The first 12 perfect squares are:  12 = 1 × 1 = 1  22 = 2 × 2 = 4  32 = 3 × 3 = 9  42 = 4 × 4 = 16  52 = 5 × 5 = 25  62 = 6 × 6 = 36  72 = 7 × 7 = 49  82 = 8 × 8 = 64  92 = 9 ×  9  = 81  102 = 10 × 10 = 100  112 = 11 × 11 = 121  122 = 12 × 12 = 144 Finding the square roots of imperfect squares can sometimes be a bit of a pain — especially if you're not using a calculator (in the sections below, you'll find tricks for making this process easier). However, it's often possible to simplify the numbers in square roots to make them easier to work with. To do this, you simply need to separate the number under the radical into its factors, then take the square root of any factors that are perfect squares and write the answer outside the radical. This is easier than it sounds — read on for more information!  Let's say that we want to find the square root of 900. At first glance, this looks very difficult! However, it's not hard if we separate 900 into its factors. Factors are the numbers that can multiply together to make another number. For instance, since you can make 6 by multiplying 1 × 6 and 2 × 3, the factors of 6 are 1, 2, 3, and 6. Instead of working with the number 900, which is somewhat awkward, let's instead write 900 as 9 × 100. Now, since 9, which is a perfect square, is separated from 100, we can take its square root on its own. √(9 × 100) = √(9) × √(100) = 3 × √(100). In other words, √(900) = 3√(100). We can even simplify this two steps further by dividing 100 into the factors 25 and 4. √(100) = √(25 × 4) = √(25) × √(4) = 5 × 2 = 10. So, we can say that √(900) = 3(10) = 30. Think — what number times itself equals -16? It's not 4 or -4 — squaring either of these gives positive 16. Give up? In fact, there isn't a way to write the square root of -16 or any other negative number with ordinary numbers. In these cases, we have to substitute imaginary numbers (usually in the form of letters or symbols) to take the place of the negative number's square root. For example, the variable "i" is usually used for the square root of -1. As a general rule, the square root of a negative number will always be an imaginary number (or include one). Note that although imaginary numbers can't be represented with ordinary digits, they can still be treated like ordinary numbers in many ways. For instance, the square roots of negative numbers can be squared to give those negative numbers, just like any other square root. For example, i2 = -1