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Please I need quick help these questions , they are due so soon and I donât know the answers. Thanks
| write the composite function in the form ng(x)) [Identify the inner function u = g(x) and the outer function y-run Using properties of logarithms, we can rewrite the equation as In(y)Inxclon), which is equivalent to In(y)-9 cos(x) 9 cos( nx)). Step 2 Note that 9 cos(x) In(x) is a product. Therefore, its derivative is given by (9 cos(x)) x) (InoII If f(1) -10 and f (x) 2 2 for 1 SxS 6, how small can f(6) possibly be? 16 Please try again. You may find the Mean Value Theorem is helpful in solving this pr Need Help? Read problem; use the ine Show transcribed image text | write the composite function in the form ng(x)) [Identify the inner function u = g(x) and the outer function y-run
Using properties of logarithms, we can rewrite the equation as In(y)Inxclon), which is equivalent to In(y)-9 cos(x) 9 cos( nx)). Step 2 Note that 9 cos(x) In(x) is a product. Therefore, its derivative is given by (9 cos(x)) x) (InoII
If f(1) -10 and f (x) 2 2 for 1 SxS 6, how small can f(6) possibly be? 16 Please try again. You may find the Mean Value Theorem is helpful in solving this pr Need Help? Read problem; use the ine
Please I need quick help these questions , they are due so soon and I donât know the answers. Thanks
| write the composite function in the form ng(x)) [Identify the inner function u = g(x) and the outer function y-run
Using properties of logarithms, we can rewrite the equation as In(y)Inxclon), which is equivalent to In(y)-9 cos(x) 9 cos( nx)). Step 2 Note that 9 cos(x) In(x) is a product. Therefore, its derivative is given by (9 cos(x)) x) (InoII
If f(1) -10 and f (x) 2 2 for 1 SxS 6, how small can f(6) possibly be? 16 Please try again. You may find the Mean Value Theorem is helpful in solving this pr Need Help? Read problem; use the ine
Show transcribed image text | write the composite function in the form ng(x)) [Identify the inner function u = g(x) and the outer function y-run Using properties of logarithms, we can rewrite the equation as In(y)Inxclon), which is equivalent to In(y)-9 cos(x) 9 cos( nx)). Step 2 Note that 9 cos(x) In(x) is a product. Therefore, its derivative is given by (9 cos(x)) x) (InoII
If f(1) -10 and f (x) 2 2 for 1 SxS 6, how small can f(6) possibly be? 16 Please try again. You may find the Mean Value Theorem is helpful in solving this pr Need Help? Read problem; use the ine
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Beverley SmithLv2
8 Jul 2019