Thursday, March 5, 2020

Put a Little Love In Your Heart for You - Introvert Whisperer

Introvert Whisperer / Put a Little Love In Your Heart for You - Introvert Whisperer Put a Little Love In Your Heart for You One of the 4 relationship building blocks I outline in the blog and programs is about giving support to the other person.   When we support someone, it is an act of love, especially if we do it without any expectation of receiving something in return. Our ability to give and receive love starts with loving self â€" often a hard thing for some people to do or to admit to.   As we go through life, we get “scuffed up” by various situations, which can take a toll on our self-worth.   You have to love self so you can love others because if you don’t, you will always be looking for something from someone else.   It’s a thirst that is never really quenched. And what if you don’t love and respect you?   Change your internal dialogue about you.   Sounds simple but it can be a habit for many.   Some people don’t even realize it but its part of their ongoing way of talking. The deal is, every time you say or think something negative about you, your brain believes it.   I have a friend who constantly says she’s stupid.   I know she’s not.   I finally pointed it out to her and she hadn’t even realized she was doing it.   She did admit that’s how she felt fairly often.   My point to her was that she had convinced herself she was stupid and how that translated into holding her back in so many ways. The best analogy for this that I can think of is to think of yourself as a glass of water.   The water is the love you give and receive.   The glass is your capacity to love and if you keep your glass small because you don’t love yourself, you won’t be able to contain much love.   Love is a truly powerful and uplifting feeling. So, isn’t it worth it to increase the size of your glass?   It allows you to give and receive more love. So, as we go speeding into this weekend, be aware of your internal dialogue to you about you.   Do you have some changes to make? -So you can increase your capacity to love?   This may be a challenge but it will totally be worth it. Love yourself. Go to top Bottom-line â€" I want to help you accelerate your career â€" to achieve what you want by connecting you with your Free Instant Access to my 4 Building Blocks to Relationships eBookâ€" the backbone to your Networking success and fantastic work relationships.  Grab yours by visiting here right now! Brought to you by Dorothy Tannahill-Moran â€" dedicated to unleashing your professional potential. Introvert Whisperer

Online Trig Identities Solver Tutors

Online Trig Identities Solver Tutors In Trigonometry, trigonometric identities are very important as they help us understand the relationship between the 6 trigonometric functions in a much better way. Identities are equations where the given trigonometric expression in the left-hand side of the equation is the same as the trigonometric expression in the right-hand side of the equation. Therefore in order to prove trigonometric identities, we must show that the left side and the right side of the equation are exactly the same! Example 1: Prove the trigonometric identity: tan(x) * cosec(x) = sec(x). In order to prove the above given trigonometric identity, we have to first start by picking any side of the equation. Here lets start with the left-hand side of the equation - tan(x) * cosec(x) We can also write the above expression as: tan(x) * cosec(x) = [sin(x)/ cos(x)] * 1/sin(x) Now sin(x) in the numerator and the denominator gets cancelled, which gives - 1/cos(x). So, 1/cos(x) is also written as sec(x) = right-hand side of the equation! Hence proved! Example 2: Prove the given trigonometric identity: tan(x) + sec(x) = [1 + sin(x)] * sec(x). In order to prove the above given trigonometric identity, we have to first start by picking any side of the equation. Here lets start with the left-hand side of the equation -tan(x) + sec(x) We can also write the above expression as: tan(x) + sec(x) = [sin(x/cos(x)] + 1/cos(x). Herecos(x) present in the denominator can be taken as the common denominator. This gives: - [1 + sin(x)]/ cos(x) which is re-written as [1 + sin(x)] * sec(x) =right-hand side of the equation! Hence proved!