h
d(h) = 630*h
Yes, h(x) is simply a function h --> x, like f(x) is a function f --> x. The different letters are used to illustrate the fact that the two functions need not be the same.
The function ( h(x) = x - 5 ) is a linear function that describes a straight line with a slope of 1 and a y-intercept at -5. It represents the output, or value of ( h(x) ), as the input ( x ) is decreased by 5. Essentially, for any given value of ( x ), the function subtracts 5 from it, shifting the graph of the function down by 5 units on the y-axis.
yes, h=1/sigma(standard deviation)
RNAase is used in plasmid preparation to degrade RNA contaminants present in the sample. This helps to ensure that the isolated plasmid DNA is free from RNA, which can interfere with downstream applications such as PCR or cloning. RNAase treatment is an important step to obtain high-quality plasmid DNA.
Most often, RNA is removed using the enzyme RNAase
A function f(x) is not differentiable at x=a if: lim h-->0 [f(a+h)-f(a)] / h does not exist.
The height of a rocket as a function of time is h (t) = 60t^1.5 where h is in meters and t is in seconds. Air temperature is a function of height according to the function T (h) = 300 - h/m where m is a constant, T is measured in kelvins (K), and h in meters. Plus log(x=5)
The height of a rocket as a function of time is h (t) = 60t^1.5 where h is in meters and t is in seconds. Air temperature is a function of height according to the function T (h) = 300 - h/m where m is a constant, T is measured in kelvins (K), and h in meters. Plus log(x=5)
The height of a rocket as a function of time is h (t) = 60t^1.5 where h is in meters and t is in seconds. Air temperature is a function of height according to the function T (h) = 300 - h/m where m is a constant, T is measured in kelvins (K), and h in meters. Plus log(x=5)
That depends on how the function is defined.
h
H(w)>0
d(h) = 630*h
H H. Snyder has written: 'A hypercomplex function-theory associated with Laplace's equation'
The restrictions on the range of the function ( H(w) ) depend on the specific form and properties of the function. If ( H(w) ) is defined such that it cannot exceed certain values, then the range may be limited to a specific interval. Options A and B suggest restrictions, while option C indicates no restrictions. Without additional context about the function, it's impossible to determine the correct answer definitively.