Solve 4 * (1) ^ 3 + 3 * (1) ^ 2 - 4(1) + K | Equatix - Math Solver

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Example

3(r+2s)=2t-4

a⋅(b-2)=3b

3(r+2s)=2t-4

a⋅(b-2)=3b

Question

$$4(1)^{3}+3(1)^{2}-4(1)+K$$

Evaluate

$K+3$

Solution Steps

Calculate $1$ to the power of $3$ and get $1$.

$$4\times 1+3\times 1^{2}-4\times 1+K$$

Multiply $4$ and $1$ to get $4$.

$$4+3\times 1^{2}-4\times 1+K$$

Calculate $1$ to the power of $2$ and get $1$.

$$4+3\times 1-4\times 1+K$$

Multiply $3$ and $1$ to get $3$.

$$4+3-4\times 1+K$$

Add $4$ and $3$ to get $7$.

$$7-4\times 1+K$$

Multiply $4$ and $1$ to get $4$.

$$7-4+K$$

Subtract $4$ from $7$ to get $3$.

$$3+K$$

Differentiate w.r.t. K

$1$

Steps Using Derivative Rule for Sum

Calculate $1$ to the power of $3$ and get $1$.

$$\frac{\mathrm{d}}{\mathrm{d}K}(4\times 1+3\times 1^{2}-4\times 1+K)$$

Multiply $4$ and $1$ to get $4$.

$$\frac{\mathrm{d}}{\mathrm{d}K}(4+3\times 1^{2}-4\times 1+K)$$

Calculate $1$ to the power of $2$ and get $1$.

$$\frac{\mathrm{d}}{\mathrm{d}K}(4+3\times 1-4\times 1+K)$$

Multiply $3$ and $1$ to get $3$.

$$\frac{\mathrm{d}}{\mathrm{d}K}(4+3-4\times 1+K)$$

Add $4$ and $3$ to get $7$.

$$\frac{\mathrm{d}}{\mathrm{d}K}(7-4\times 1+K)$$

Multiply $4$ and $1$ to get $4$.

$$\frac{\mathrm{d}}{\mathrm{d}K}(7-4+K)$$

Subtract $4$ from $7$ to get $3$.

$$\frac{\mathrm{d}}{\mathrm{d}K}(3+K)$$

The derivative of a polynomial is the sum of the derivatives of its terms. The derivative of a constant term is $0$. The derivative of $ax^{n}$ is $nax^{n-1}$.

$$K^{1-1}$$

Subtract $1$ from $1$.

$$K^{0}$$

For any term $t$ except $0$, $t^{0}=1$.

$$1$$