31:23
Indices: How to Solve Indices Problems||Rules of Indices
Precious Ugwueze (Maths Experience)
11:50
Indices: How to solve exponential equations problems
8:49
Indices: How to solve exponential equations not convertible to common base
8:47
Indices: Special exponential equations not convertible to common base. Part 2
4:50
Given 1728 = 2^a.3^b, find positive integers a and b|| equations requiring products of prime factors
10:27
Indices Problem: Make the indices of the expression positive, (abc^-⁴)^⅓÷(a³b^-³c)¼
8:05
Exponential Equation: Solve for x in 3[2^(2x+3)]-5[2^(x+3)]-156 = 0
4:07
Indices: Evaluate [sqrt(8.81x10^-5) ÷ sqrt(1.44x10^4)]
10:18
Indices: Nice Examination Question - Solve 3[2^(2x+3)] - 5[2^(x+3)] - 156 = 0.
6:18
Indices: Solve 3^(2x+1) + 3^(x+1) = 12
4:24
Evaluate log1(base 2) + log½(base 4) = logx(base 9)
8:14
Olympiad Math Problem || Suppose x⁵y¹⁷ = r, x²y⁷= s, x = r^a ÷ s^b, and y = s^c ÷ r^d, find a+b+c+d.
8:12
Olympiad Math || If sqrt(x-b²) - sqrt(x-a²) = a-b, find x. #olympiadmath
Olympiad Math | #mathisfun | If (m+n)²=m²+n², find (3^m)^n.
5:57
Olympiad Math || What is the minimum value of y = x²+8x+15 | #mathisfun
5:45
#mathisfun | Make t the subject of the #equation s= ut + ½gt² | Olympiad Math
8:26
A Simple and Beautiful connection between Quadratic Graphs and Stationary Points of functions.
13:39
Olympiad Math | Systems of Equations | A difficult easy example
8:46
How to do Implicit Differentiation | Differentiating with respect to x and y.
11:10
How to solve Implicit Differentiation By a formula || dy/dx = -f_x/f_y
3:14
Solve the equation log(x²-1) = log(x-1) +1
4:57
Indices and Logarithms | Express x in terms of a if 2ln(x+4) - lnx = ln(x+a).
1:36
What is x if 2^(x^3) = 256? || How to solve indices Problems
9:56
How to solve 3^y = y^9 || Laws of Indices