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Count On Pat Math Tutoring
Need help in math? Say no more! If you're struggling in math, Pat's got the patience and the prowess to help you succeed!
Algebra/College Math: $30/hr
Trigonometry: $36/hr
Calc I: $40/hr
E-mail [email protected] Algebra/College Math/Geometry: $30/hr
Trigonometry/Statistics: $36/hr
Calculus I: $40/hr
I just wanted to announce a change regarding transactions for tutoring services via Count On Pat Math Tutoring.
Effectively immediately, customers will need to pay for tutoring services one (1) calendar day prior to the scheduled tutoring session. In unique cases where tutoring is requested same-day, customers will need to pay for tutoring services before the scheduled session begins.
Thank you for your cooperation!
12/08/2021
Watch this reel by waste.clipx on Instagram waste.clipx • Original Audio
09/18/2021
😂😂😂
09/10/2021
Some cool measurement math for y'all.👌🏾
05/20/2021
Roman Numerals confusing you?
Hmu! I've got you covered!
DM me or shoot me an email at [email protected]
05/16/2021
Have a blessed Sunday fam
05/10/2021
A big thank you to my Facebook fam for your referrals and to my loyal students who continue to support Count On Pat Math Tutoring
05/09/2021
To all the Mothers, wishing you multiples of 💐 flowers minus the dirty 🍽️ dishes. From my family to yours, Happy Mother's Day!
02/08/2021
Hey there, Math Fans! I figured I'd share a pretty cool application of calculus in action to show that although sometimes all these integrals and derivatives might seem like they don't have much of a real-world application, you can actually use calculus to solve some of life's toughest problems!
I'm in a Differential Equations class at Southern New Hampshire University and we learned about Newton's Law of Cooling, which states that the rate of change in temperature of an object/person is proportional to the difference between the ambient temperature and the temperature of the object/person.
If you have an initial temperature reading and another temperature reading before the object's/person's temperature reaches the ambient temperature, you can use calculus to find the equation for the object/person's temperature at any time after initial conditions.
With that said, if a person died (assuming the ambient temperature and conditions remain constant), I know how to use Newton's Law of Cooling to tell how long ago the person died as long as the body's temperature isn't the same as the ambient temperature.
I'm doing a report on this in 2 weeks and it's a pretty exciting assignment where I actually get to apply calculus to do something cool.
I definitely plan on screenshots of the report on this page so you all can see how it all works. More to come!
And as always....if you, your kids, your family, your friends, your co-workers, etc. need help with math in the meantime, please feel free to reach out!
01/05/2021
Have you ever wondered why e^(ln x) is equal to x?
This video does a great job at explaining why via mathematical proof.
Why does e^(ln x) = x Why does e^(ln x) equal to x (Proof)Start the proof by letting y = e^(ln x) and applying the natural log to both sides. By following standard logarithmic rul...
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