How do you solve the exponential equation #2^(x+2)=16^x#?
2017年2月17日 · Note that #16=2^4#. #rArr2^(x+2)=(2^4)^x# #rArrcolor(red)(2)^(x+2)=color(red)(2)^(4x)# Since the bases are equal, that is #color(red)(2)# then the exponents are equal.
SOLUTION: graph (Show your work) y=16-x^2 Thanks a bunch
c = 16 Substitute these values into the formula above to find that (0, 16) is the vertex point. The expression 16 - x^2 can be factored as a difference of squares. (4 + x)*(4 - x)=0 So, the x-intercepts of the graph are (-4, 0) and (4, 0). Pick some other values of x, and find the corresponding values of y to get a few more points to plot.
How do you integrate int x / sqrt(16+x^2) dx using ... - Socratic
For integrals involving the root #sqrt(x^2+a^2),# we can use the substitution #x=atantheta#.Here, #a^2=16, a=4, x=4tantheta#
How do you find the definite integral of #(x^3)/sqrt(16 - Socratic
2018年6月1日 · Substitute #x=4sin theta# to turn the denominator into a simple trig function via the identity #sin^2 theta +cos^2 theta=1#. Note that #(dx)/(d theta)=4 cos theta# and that the limits of integration #x=0,2sqrt(3)# are equivalent to #theta=0,pi/3# .
How do you integrate #int x^2sqrt(16-x^2)# by trigonometric
2018年3月23日 · Perform the substitution. #x=4sintheta#, #=>#, #dx=4costhetad theta# #sqrt(16-x^2)=sqrt(16-16sin^2theta)=4costheta#
How do you solve #x^2+16=0# using the quadratic formula?
2018年2月22日 · If x^2+16=0 x=+-sqrt(-16) If ax^2+bx+c=0, then x=1/(2a)(-b+-sqrt(b^2-4ac)) For x^2+16=0 a=1, b=0, c=16 Substituting x=1/(2xx1)(-0+-sqrt(0^2-4xx1xx16)) =1/2xx+-sqrt ...
How do you find the derivative of #y=x*sqrt(16-x^2)#? - Socratic
2018年3月11日 · I find that problems like this are solved easier by applying our rules of logarithmic functions. #y = x*sqrt(16-x^2)# We know from the rules of algebra that manipulated one side of an equation by applying an operator to both sides is still an equivalent function, but in an alternative form.
How do you integrate int x/sqrt (16-x^2) by trigonometric
2016年9月10日 · -sqrt(16-x^2)+C Although this is well set up for a shorter, non-trigonometric substitution (see: u=16-x^2), we can make the trigonometric substitution x=4sintheta. Note that this means that dx=4costhetad theta.
How do you integrate #int x^3sqrt(16-x^2)# by trigonometric
2018年5月5日 · Here, #I=intx^3sqrt(16-x^2)dx# Let, #x=4sinu=>dx=4cosudu# #and sinu=x/4=>cosu=sqrt(1-sin^2u)=sqrt(1-x^2/16# ...
How do you factor and solve 16x^2-40x+25=0? - Socratic
2018年4月9日 · x = -5/4 To factor, we first look to see if there is an immediate factor that is common to all terms. In this case, there is not. Next, we look to find a pair of numbers that when multiplied will give 25 and when added will give -40. The x^2 term has a non-one coefficient, so this will affect possible pairs. The factors of 25 are: (1, 25) (5,5) The factors of 16 are: (1,16) …