This expression, (5x-3/x^0), is ambiguous. Is it (5x - 3)/1 or 5x - (3/1)? If it's the former, you're missing some needed parentheses.zebra1707 said:Homework Statement
Greetings - can someone please check my work, many thanks
Homework Equations
If x = 12.4 Find the value of ... correct to two sig fgures
8^(4x/3) / log(base 10) (5x-3/x^0)
Neither of these expressions is right. Starting with 8^(4x/3), how did you get 8^(16 8/15)? I'm assuming the part in parentheses is 16 + 8/15. If you substitute 12.4 for x, and multiply by 4/3, what do you get?zebra1707 said:The Attempt at a Solution
= 8^(16 8/15) / log(base 10) (5(12.4)-3 / 1)
= 4.8 x 10^14 (via calc 4.818429574)
zebra1707 said:Many thanks
That much is obvious.zebra1707 said:Hi Mark
For this question - I need to substitute 12.4 into all x values.
No you don't. Where did the 3 go?zebra1707 said:(5x-3/x to the power 0) so if you substitute 12.4 into the x in this part of the equation (12.4^0), yes, you will get (5(12.4)/1).
zebra1707 said:Is a substitution question.
I don't yet understand how to add the Maths chararcters in the Forum.
Cheers
Checking your logs and exponential homework answers allows you to review and confirm your work, identify any mistakes or errors, and improve your understanding of the material.
It is recommended to check your logs and exponential homework answers after completing each assignment, as well as before exams or quizzes to ensure accuracy and understanding.
If you find a mistake, take the time to correct it and understand where you went wrong. This will help you avoid similar mistakes in the future and improve your overall understanding of the material.
Yes, there are various online resources and tools that can assist with checking your logs and exponential homework answers, such as online calculators or step-by-step solutions guides.
No, it is also important to check for understanding. Make sure you can explain the concepts and steps to solving each problem, rather than just copying the correct answers.