The derivative of ax is ax log a. - Mathematics and Statistics

प्रश्न

The derivative of a^x is a^xlog a.

विकल्प

True
False

MCQ

सत्य या असत्य

उत्तर

This statement is True.

shaalaa.com

The Concept of Derivative - Derivatives of Logarithmic Functions

क्या इस प्रश्न या उत्तर में कोई त्रुटि है?

Q III] 8)Q III] 7)Q III] 9)

अध्याय 3: Differentiation - MISCELLANEOUS EXERCISE - 3 [पृष्ठ १००]

APPEARS IN

बालभारती Mathematics and Statistics 1 (Commerce) [English] Standard 12 Maharashtra State Board

अध्याय 3 Differentiation
MISCELLANEOUS EXERCISE - 3 | Q III] 8) | पृष्ठ १००

2025-2026 (March) Model set 1 by shaalaa.com (with solutions)

Q 1.B.i | 1 mark

संबंधित प्रश्न

Find `"dy"/"dx"`if, y = `"x"^("x"^"2x")`

Find `"dy"/"dx"`if, y = `(1 + 1/"x")^"x"`

Find `"dy"/"dx"`if, y = `(log "x"^"x") + "x"^(log "x")`

Find `"dy"/"dx"`if, y = `10^("x"^"x") + 10^("x"^10) + 10^(10^"x")`

If y = e^logxthen `dy/dx` = ?

If y = log `("e"^"x"/"x"^2)`, then `"dy"/"dx" = ?`

Fill in the Blank

If 0 = log(xy) + a, then `"dy"/"dx" = (-"y")/square`

If y = x log x, then `(d^2y)/dx^2`= ______.

If y = `"e"^"ax"`, then `"x" * "dy"/"dx" =`______.

State whether the following is True or False:

The derivative of `log_ax`, where a is constant is `1/(x.loga)`.

State whether the following is True or False:

If y = log x, then `"dy"/"dx" = 1/"x"`

Solve the following:

If y = [log(log(logx))]², find `"dy"/"dx"`

Find `"dy"/"dx"` if y = `"x"^"x" + ("7x" - 1)^"x"`

Choose the correct alternative:

If y = (x )^x + (10)^x, then `("d"y)/("d"x)` = ?

If y = `"a"^((1 + log"x"))`, then `("d"y)/("d"x)` is ______

If u = e^x and v = log_ex, then `("du")/("dv")` is ______

If x = t.logt, y = t^t, then show that `("d"y)/("d"x)` = t^t

Find `("d"y)/("d"x)`, if y = (log x)^x + (x)log^x

Find `("d"y)/("d"x)`, if y = `root(3)(((3x - 1))/((2x + 3)(5 - x)^2)`

Find `("d"y)/("d"x)`, if y = x^(x) + 20^(x)

Solution: Let y = x^(x) + 20^(x)

Let u = `x^square` and v = `square^x`

∴ y = u + v

Diff. w.r.to x, we get

`("d"y)/("d"x) = square/("d"x) + "dv"/square` .....(i)

Now, u = x^x

Taking log on both sides, we get

log u = x × log x

Diff. w.r.to x,

`1/"u"*"du"/("d"x) = x xx 1/square + log x xx square`

∴ `"du"/("d"x)` = u(1 + log x)

∴ `"du"/("d"x) = x^x (1 + square)` .....(ii)

Now, v = 20^x

Diff.w.r.to x, we get

`"dv"/("d"x") = 20^square*log(20)` .....(iii)

Substituting equations (ii) and (iii) in equation (i), we get

`("d"y)/("d"x)` = x^x(1 + log x) + 20^x.log(20)

`int 1/(4x^2 - 1) dx` = ______.

Find `dy/dx "if",y=x^(e^x) `

Find `dy/dx "if", y = x^(e^x)`

Find `dy/dx` if, y = `x^(e^x)`

Find `dy/dx` if, `y = x^(e^x)`

Find `dy/dx "if", y = x^(e^x)`

The derivative of ax is ax log a. - Mathematics and Statistics

Advertisements

Advertisements

प्रश्न

विकल्प

Advertisements

उत्तर

APPEARS IN

संबंधित प्रश्न

Select a course

The derivative of ax is ax log a. - Mathematics and Statistics

Advertisements

Advertisements

प्रश्न

विकल्प

Advertisements

उत्तरShow Solution

APPEARS IN

संबंधित प्रश्न

Select a course

उत्तर