Article: Tracking your meals, snacks and beverages in a food journal can help you become more aware of what you eat and also help you stay on track with a new diet plan. Purchase a journal or download a journaling app on your smart phone. Track as many days as you can. Ideally, track a few weekdays and a few weekend days. Many people eat different on weekends compared to a more structured work day. Check in with your weight daily to see how you are coming along with your weight loss. Regular daily weight check-ins may also help keep you motivated and improve your weight loss results. Step on the scale every morning as part of your daily routine, such as right before you brush your teeth in the morning. Writing down goals can be helpful with any type of change, but is especially helpful with weight loss. Jot down a few ideas of the goals you want to achieve throughout your 3 month timeline.  Be specific with your goal. Make sure it's timely, specific and realistic. Remember, large amounts of weight loss are not realistic and are most likely not safe or healthy. Set smaller goals before your long-term goals. Maybe make a goal for each month or every two weeks during your 3 month timeline.
Question: What is a summary of what this article is about?
Track your meals in a food journal. Weigh yourself daily. Write down your goals.
Article: You cannot find the absolute value of imaginary numbers the same way you found it for rational numbers. That said, you can easily find the absolute value of a complex equation by plugging it into the distance formula. Take the expression |3−4i|{\displaystyle |3-4i|}, for example.   Problem:|3−4i|{\displaystyle |3-4i|}   Note: If you see the expression −1{\displaystyle {\sqrt {-1}}}, you can replace it with "i." The square root of -1 is an imaginary number, known as i. |i|=1{\displaystyle |i|=1} Think of 3-4i as an equation for a line. Absolute value is the distance from zero, so you want to find the distance from zero for the point (3, -4) on this line.The coefficients are simply the two numbers that aren't "i." While the number by the i is usually the second number, it doesn't actually matter when solving. To practice, find the following coefficients:   |1+6i|{\displaystyle |1+6i|} = (1, 6)  |2−i|{\displaystyle |2-i|} = (2, -1)  |6i−8|{\displaystyle |6i-8|} = (-8, 6) All you need at this point are the coefficients. Remember, you need to find the distance from the equation to zero. Since you use the distance formula in the next step, this is the same thing as taking absolute value. To find distance, you'll use the distance formula, known as x2+y2{\displaystyle {\sqrt {x^{2}+y^{2}}}}. So, for your first step, you need to square both coefficients of your complex equation. Continuing the example |3−4i|{\displaystyle |3-4i|}:   Coefficients: (3, -4)  Distance formula: 32+(−4)2{\displaystyle {\sqrt {3^{2}+(-4)^{2}}}}   Square the coefficients: ' 9+16{\displaystyle {\sqrt {9+16}}}   Note: Review the distance formula if you're confused. Note now squaring both numbers makes them positive, effectively taking absolute value for you. The radical is the sign that takes the square root. Simply add them up, leaving the radical in place for now.   Coefficients: (3, -4)  Distance formula: 32+(−4)2{\displaystyle {\sqrt {3^{2}+(-4)^{2}}}}   Square the coefficients: 9+16{\displaystyle {\sqrt {9+16}}}   Add up squared coefficients: 25{\displaystyle {\sqrt {25}}} All you have to do is simplify the equation to get your final answer. This is the distance from your "point" on an imaginary graph zero. If there is no square root, just leave the answer from the last step under the radical-- this is a legitimate final answer.   Coefficients: (3, -4)  Distance formula: 32+(−4)2{\displaystyle {\sqrt {3^{2}+(-4)^{2}}}}   Square the coefficients: 9+16{\displaystyle {\sqrt {9+16}}}   Add up squared coefficients: 25{\displaystyle {\sqrt {25}}}   Take the square root to get your final answer: 5  |3−4i|=5{\displaystyle |3-4i|=5} Use your mouse to click and highlight right after the questions to see the answers, written here in white.   |1+6i|{\displaystyle |1+6i|} = √37   |2−i|{\displaystyle |2-i|} =  √5   |6i−8|{\displaystyle |6i-8|} = 10
Question: What is a summary of what this article is about?
Note any complex equations with imaginary numbers, like "i" or −1{\displaystyle {\sqrt {-1}}} and solve separately. Find the coefficients of the complex equation. Remove the absolute value signs from the equation. Square both coefficients. Add the squared numbers under the radical. Take the square root to get your final answer. Try a few practice problems.
Article: Gypsy-style tops are very '70s, and they can help you create that perfect bohemian look. Try an off-the shoulder top that's loose and flowing with a fun bohemian print. To accessorize, add a pair of John Lennon-style round glasses, a funky headband, and a fringed purse. You may think you need to minimize the volume on top if you're wearing bell bottoms. Actually, wearing some volume on top can add drama to your outfit.  For instance, try wearing a shirt dress over bell bottoms for an elongating effect. Another option is a bulky sweater. You don't have to choose something extravagant to go with your bell bottoms. You can just toss on a fun t-shirt and head out the door. Try a fun tie-dye shirt for a instantaneous throwback look, or you could even rock a vintage rock band shirt. Bell bottoms in the '70s often skimmed the ground, so to capture that look, you should go for length. Yours don't have to skim the ground, but you may want to opt for a slightly longer length than you normally do. Pick a pair of pants with some whimsical floral embroidery to help you get that retro look. You can even add a few floral patches if you can't find an embroidered pair you like.
Question: What is a summary of what this article is about?
Create a bohemian look with gypsy tops. Wear volume on volume for more drama. Pair bell bottoms with a simple t-shirt for an everyday look. Pick longer bell bottoms to give you that 1970s feel. Add a touch of embroidery for a truly retro look.