INPUT ARTICLE: Article: Keep a pack of makeup remover cloths and a compact mirror with you throughout your day. If you notice your eyeliner shifting, fold a makeup cloth in a triangle shape and use an edge to wipe off excess makeup. Use gently and sparingly to avoid cleaning off too much makeup. Be mindful of your makeup and try not to rub or touch the area around your eyes too much. You may be doing it unconsciously, but if you make a point of trying to remember then it should become second nature to you to avoid touching your eye area. Hot and sticky weather can melt your makeup and make it run. If you can avoid it, try not to spend excessive time in the heat. If you are spending time outside on a sunny day, wear sunglasses. This can shield your eye area from the sun and also prevents your eyes from watering as you squint. Many eyeliners are not waterproof. A rainstorm, a swim session or a shower can all cause your makeup to run. Do your best to avoid getting your face wet after you put your makeup on. Also avoid excessive sweating, as this can have a similar effect of shifting your eye makeup.

SUMMARY: Use makeup remover throughout the day. Avoid rubbing your eyes. Avoid the heat. Avoid getting your face wet.


INPUT ARTICLE: Article: Outline one of these triangles. You will use it to find the length of one side of the rhombus. Since the triangles are congruent, it doesn’t matter which one you outline. The two diagonals of a rhombus are perpendicular, so the central angle of your triangle will be 90 degrees. The hypotenuse is the side opposite a 90 degree angle.Traditionally, the hypotenuse is labeled c{\displaystyle c}. The hypotenuse of your triangle is one side of the rhombus. So, if you find the length of c{\displaystyle c}, you will know the length of one side of the rhombus. Traditionally, these are labeled a{\displaystyle a} and b{\displaystyle b}. To do this, divide the length of the diagonal that a{\displaystyle a} runs along by 2. Label the side length on your triangle.  Since the diagonals of a rhombus bisect each other, you know that the length on either side of their intersection will be equal. Since side a{\displaystyle a} is half the length of the diagonal, you can find its length by dividing the diagonal length in half. For example, if side a{\displaystyle a} runs along a diagonal that is 12 meters long, you can find the length of side a{\displaystyle a} by calculating:a=122{\displaystyle a={\frac {12}{2}}}a=6{\displaystyle a=6} To do this, divide the length of the diagonal that b{\displaystyle b} runs along by 2. Label the side length on your triangle. For example, if side b{\displaystyle b} runs along a diagonal that is 16 meters long, you can find the length of side b{\displaystyle b} by calculating:b=162{\displaystyle b={\frac {16}{2}}}b=8{\displaystyle b=8} The theorem states that a2+b2=c2{\displaystyle a^{2}+b^{2}=c^{2}}. This is a basic geometric formula for finding the side lengths of a right triangle. Make sure you substitute for a{\displaystyle a} and b{\displaystyle b}, but the order doesn’t matter due to the commutative property. For example, if a=6{\displaystyle a=6} and b=8{\displaystyle b=8}, your equation will look like this: 62+82=c2{\displaystyle 6^{2}+8^{2}=c^{2}}. To do this, you need to square a{\displaystyle a} and b{\displaystyle b}, add, then find the square root of the sum. For example:62+82=c2{\displaystyle 6^{2}+8^{2}=c^{2}}36+64=c2{\displaystyle 36+64=c^{2}}100=c2{\displaystyle 100=c^{2}}100=c2{\displaystyle {\sqrt {100}}={\sqrt {c^{2}}}}10=c{\displaystyle 10=c} Since the hypotenuse is also the side of the rhombus, to find the perimeter of the rhombus, you need to plug the value of c{\displaystyle c} into the formula for the perimeter of a rhombus, which is P=4S{\displaystyle P=4S}, where s{\displaystyle s} equals the length of one side of the rhombus. In this case, it is the same value that we found for c{\displaystyle c}. For example: P=4S{\displaystyle P=4S}P=4(10){\displaystyle P=4(10)}P=40{\displaystyle P=40} Don’t forget to include the correct unit of measurement. For example, a rhombus that has diagonals measuring 12 and 16 meters long has a perimeter of 40 meters.

SUMMARY: Notice that the two diagonals of your rhombus create four congruent triangles. Identify the 90 degree angle of your triangle. Label the hypotenuse of your triangle. Label the other two sides of your triangle. Find the length of side a{\displaystyle a}. Find the length of side b{\displaystyle b}. Set up the Pythagorean Theorem. Plug in the known side lengths of your triangle into the Pythagorean Theorem. Solve for c{\displaystyle c}. Multiply c{\displaystyle c} by four. Write your final answer.


INPUT ARTICLE: Article: It's the T icon near the Pen Tool in the toolbar on the left side of the window. A drop-down menu will appear. It's at the top of the drop-down menu. Do so in the area where you want the text to be. Use the drop-down menus in the upper-left and center of the window to select a font, style, and size. It's at the top of the window, toward the right side. It's the button at the top of the window that looks like a T with a curved line beneath it. Do so by clicking on the options in the "Style:" drop-down menu.  As you select styles, the text will change to preview the look. Use the radio buttons to choose a vertical or horizontal bend. Change the degree of the text's arc by moving the “Bend” slider to the left or right. Increase or decrease distortion of the text with the "Horizontal" and "Vertical" Distortion sliders.

SUMMARY:
Long click on the Text Tool. Click on Horizontal Type Tool. Double-click in the window. Type the text you want to bend. Click on ☑️. Click on the Warp Text Tool. Select an effect. Click on OK when you're finished.