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  • Inequation:
  • 7-9x>3
  • 4x^2-9x-9=>0
  • 1,5^((x^2+x-20)/x)<=1,5^0
  • x^2*log(16)*x*1/log(x)>=log(16)*1/log(x^5)+x*log(2)*1/log(x)

  • Identical expressions

  • x^ two *log(sixteen)*x* one /log(x)>=log(sixteen)* one /log(x^ five)+x*log(two)* one /log(x)
  • x squared multiply by logarithm of (16) multiply by x multiply by 1 divide by logarithm of (x) greater than or equal to logarithm of (16) multiply by 1 divide by logarithm of (x to the power of 5) plus x multiply by logarithm of (2) multiply by 1 divide by logarithm of (x)
  • x to the power of two multiply by logarithm of (sixteen) multiply by x multiply by one divide by logarithm of (x) greater than or equal to logarithm of (sixteen) multiply by one divide by logarithm of (x to the power of five) plus x multiply by logarithm of (two) multiply by one divide by logarithm of (x)
  • x2*log(16)*x*1/log(x)>=log(16)*1/log(x5)+x*log(2)*1/log(x)
  • x2*log16*x*1/logx>=log16*1/logx5+x*log2*1/logx
  • x²*log(16)*x*1/log(x)>=log(16)*1/log(x⁵)+x*log(2)*1/log(x)
  • x to the power of 2*log(16)*x*1/log(x)>=log(16)*1/log(x to the power of 5)+x*log(2)*1/log(x)
  • x^2log(16)x1/log(x)>=log(16)1/log(x^5)+xlog(2)1/log(x)
  • x2log(16)x1/log(x)>=log(16)1/log(x5)+xlog(2)1/log(x)
  • x2log16x1/logx>=log161/logx5+xlog21/logx
  • x^2log16x1/logx>=log161/logx^5+xlog21/logx
  • x^2*log(16)*x*1 divide by log(x)>=log(16)*1 divide by log(x^5)+x*log(2)*1 divide by log(x)

  • Similar expressions

  • x^2*log(16)*x*1/log(x)>=log(16)*1/log(x^5)-x*log(2)*1/log(x)
Solving inequalities/ x^2*log(16)*x*1/log(x)>=log(16)*1/log(x^5)+x*log(2)*1/log(x)

x^2*log(16)*x*1/log(x)>=log(16)*1/log(x^5)+x*log(2)*1/log(x) inequation

A inequation with variable

The solution

You have entered [src] 
 2                                
x *log(16)*x    log(16)   x*log(2)
------------ >= ------- + --------
   log(x)          / 5\    log(x) 
                log\x /
$$\frac{x x^{2} \log{\left(16 \right)}}{\log{\left(x \right)}} \geq \frac{x \log{\left(2 \right)}}{\log{\left(x \right)}} + \frac{\log{\left(16 \right)}}{\log{\left(x^{5} \right)}}$$ 
(x*(x^2*log(16)))/log(x) >= (x*log(2))/log(x) + log(16)/log(x^5)
Solving inequality on a graph
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