Dual basis of Lagrange nodal variables in $R^d$

Question

I am studying some theories around FEM method in 2D, and I am trying to solve this problem from Ciarlet's book (the proof was not provided): Consider a simplex $T$ in $R^d$ with $N_1(T) = \left\{N_i\right\}_{i=0}^{d}\subset P_1^{*}(T)$ be the Lagrange nodal variables (or nodal evaluation). By the Riesz representation theorem, there exist functions $\lambda_{i}^{*}\in P_1(T)$ (which is the representation of $N_i\in P_1(T)$) such that $N_j(\lambda_{i}) = \int_{T} \lambda_{i}\lambda_{j}^{*} = \delta_{ij}$ for each $0\leq i\leq d$. Show that $\lambda_{i}^{*} = \frac{(1+d)^2}{|T|}\lambda_{i} - \frac{1+d}{|T|}\sum_{j\neq i} \lambda_j$

My attempt: I was thinking that $\lambda_i^{*}$ plays a role like a Fourier coefficient, so I multiply both sides by $\lambda_j$ and integrate over $T$. Then LHS would be $\delta_{ji}$, while RHS $= \frac{(1+d)^2}{|T|}\int_{T} \lambda_{i}\lambda_{j} - \frac{1+d}{|T|}\sum_{j\neq i}\int_{T} \lambda_{i}\lambda_{j}$. Now, for $i=j$, then $LHS=1$, and I was thinking of $\int_{T} \lambda_{i}\lambda_{i} = $ the area of region $T$, but then it would result in $(1+d)^2,$ which is certainly not equal to $1$ (contradiction). I got stuck here completely....

My question: Could anyone please help me with this problem? It seems to be such a beautiful identity, yet quite hard to prove. Any thoughts would really be appreciated.

Answer 1

(failed to edit the comment-answer in 5 minutes fully)

In fact, no, I am sure there is a nice way to compute all this but now can think only of a brute force one. $\int_{T^{hat}} \lambda_1^2 = \int_{T^{hat}} x_1^2 dx = \int_0^1 x_1^2 V_{d-1}(1-x_1) dx_1$ where $V_k(r)$ is the volume of $k$-dimensional canonical simplex with side lentghs equal to $r$. So, I guess $V_k(r) = r^k V_k(1) = r^k / k!$. So I got something like $\int_{T^{hat}} \lambda_1^2 dx = 1/(d-1)! \cdot 2 / (d(d+1)(d+2)) = \frac{2}{ (d+2)!}$. Which differs from your value. The integral for a product $\lambda_i \lambda_j$ is more tedious, since leads to something like 2d-integral $\int_0^1 x_1 \int_0^1 x_2 (1-x_1-x_2)^{d-2} dx_1 dx_2 \cdot \frac{1}{(d-2)!}$ which is doable. Hope someone would come up with a nice and easy answer to overall question.