colarific value of wood is 9,000 kj/kg .how much of wood is required to produce 180000 kj of heat energy
Answers
Answer:
500
Explanation:
In this method of integration by substitution, any given integral is transformed into a simple form of integral by substituting the independent variable by others. Take for example an equation having an independent variable in x, i.e. ∫sin (x3).\fcolorbox{aquaq}{green}{★Answer★}★Answer★ In this method of integration by substitution, any given integral is transformed into a simple form of integral by substituting the independent variable by others. Take for example an equation having an independent variable in x, i.e. ∫sin (x3).\fcolorbox{aquaq}{green}{★Answer★}★Answer★ In this method of integration by substitution, any given integral is transformed into a simple form of integral by substituting the independent variable by others. Take for example an equation having an independent variable in x, i.e. ∫sin (x3).\fcolorbox{aquaq}{green}{★Answer★}★Answer★ In this method of integration by substitution, any given integral is transformed into a simple form of integral by substituting the independent variable by others. Take for example an equation having an independent variable in x, i.e. ∫sin (x3).In this method of integration by substitution, any given integral is transformed into a simple form of integral by substituting the independent variable by others. Take for example an equation having an independent variable in x, i.e. ∫sin (x3).\fcolorbox{aquaq}{green}{★Answer★}★Answer★ In this method of integration by substitution, any given integral is transformed into a simple form of integral by substituting the independent variable by others. Take for example an equation having an independent variable in x, i.e. ∫sin (x3).\fcolorbox{aquaq}{green}{★Answer★}★Answer★ In this method of integration by substitution, any given integral is transformed into a simple form of integral by substituting the independent variable by others. Take for example an equation having an independent variable in x, i.e. ∫sin (x3).\fcolorbox{aquaq}{green}{★Answer★}★Answer★ In this method of integration by substitution, any given integral is transformed into a simple form of integral by substituting the independent variable by others. Take for example an equation having an independent variable in x, i.e. ∫sin (x3).\fcolorbox{aquaq}{green}{★Answer★}★Answer★ In this method of integration by substitution, any given integral is transformed into a simple form of integral by substituting the independent variable by others. Take for example an equation having an independent variable in x, i.e. ∫sin (x3).\fcolorbox{aquaq}{green}{★Answer★}★Answer★ In this method of integration by substitution, any given integral is transformed into a simple form of integral by substituting the independent variable by others. Take for example an equation having an independent variable in x, i.e. ∫sin (x3).\fcolorbox{aquaq}{green}{★Answer★}★Answer★ In this method of integration by substitution, any given integral is transformed into a simple form of integral by substituting the independent variable by others. Take for example an equation having an independent variable in x, i.e. ∫sin (x3).\fcolorbox{aquaq}{green}{★Answer★}★Answer★ In this method of integration by substitution, any given integral is transformed into a simple form of integral by substituting the independent variable by others. Take for example an equation having an independent variable in x, i.e. ∫sin (x3).\fcolorbox{aquaq}{green}{★Answer★}★Answer★ In this method of integration by substitution, any given integral is transformed into a simple form of integral by substituting the independent variable by others. Take for example an equation having an independent variable in x, i.e. ∫sin (x3).
pls mark as brainliest